GEOPRIV M. Thomson Internet-Draft J. Winterbottom Intended status: Standards Track Andrew Expires: December 7, 2008 June 5, 2008 Representation of Uncertainty and Confidence in PIDF-LO draft-thomson-geopriv-uncertainty-01 Status of this Memo By submitting this Internet-Draft, each author represents that any applicable patent or other IPR claims of which he or she is aware have been or will be disclosed, and any of which he or she becomes aware will be disclosed, in accordance with Section 6 of BCP 79. Internet-Drafts are working documents of the Internet Engineering Task Force (IETF), its areas, and its working groups. Note that other groups may also distribute working documents as Internet- Drafts. Internet-Drafts are draft documents valid for a maximum of six months and may be updated, replaced, or obsoleted by other documents at any time. It is inappropriate to use Internet-Drafts as reference material or to cite them other than as "work in progress." The list of current Internet-Drafts can be accessed at http://www.ietf.org/ietf/1id-abstracts.txt. The list of Internet-Draft Shadow Directories can be accessed at http://www.ietf.org/shadow.html. This Internet-Draft will expire on December 7, 2008. Thomson & Winterbottom Expires December 7, 2008 [Page 1] Internet-Draft Uncertainty & Confidence June 2008 Abstract The key concepts of uncertainty and confidence as they pertain to location information are defined. A form for the representation of confidence in Presence Information Data Format - Location Object (PIDF-LO) is described, optionally including the form of the uncertainty. Suggested methods for the manipulation of location estimates that include uncertainty information are outlined. Table of Contents 1. Introduction . . . . . . . . . . . . . . . . . . . . . . . . . 4 1.1. Conventions and Terminology . . . . . . . . . . . . . . . 4 2. A General Definition of Uncertainty and Confidence . . . . . . 5 2.1. Uncertainty as a Probability Distribution . . . . . . . . 5 2.2. Deprecation of the Terms Precision and Resolution . . . . 7 2.3. Accuracy as a Qualitative Concept . . . . . . . . . . . . 7 3. Uncertainty in Location . . . . . . . . . . . . . . . . . . . 9 3.1. Representation of Uncertainty and Confidence in PIDF-LO . 9 3.2. Uncertainty and Confidence for Civic Addresses . . . . . . 11 3.3. DHCP Location Configuration Information and Uncertainty . 11 4. Manipulation of Uncertainty . . . . . . . . . . . . . . . . . 12 4.1. Reduction of a Location Estimate to a Point . . . . . . . 12 4.1.1. Centroid Calculation . . . . . . . . . . . . . . . . . 13 4.2. Increasing and Decreasing Uncertainty and Confidence . . . 17 4.2.1. Rectangular Distributions . . . . . . . . . . . . . . 18 4.2.2. Normal Distributions . . . . . . . . . . . . . . . . . 18 4.3. Determining Whether a Location is Within a Given Region . 19 4.3.1. Determining the Area of Overlap for Two Circles . . . 20 4.4. Obfuscation of Location Estimates for Privacy Reasons . . 21 5. Examples . . . . . . . . . . . . . . . . . . . . . . . . . . . 23 5.1. Reduction to a Point or Circle . . . . . . . . . . . . . . 23 5.2. Increasing and Decreasing Confidence . . . . . . . . . . . 26 5.3. Matching Location Estimates to Regions of Interest . . . . 26 5.4. Obfuscating Location Estimates . . . . . . . . . . . . . . 26 6. Confidence Schema . . . . . . . . . . . . . . . . . . . . . . 28 7. Security Considerations . . . . . . . . . . . . . . . . . . . 29 8. IANA Considerations . . . . . . . . . . . . . . . . . . . . . 30 8.1. URN Sub-Namespace Registration for urn:ietf:params:xml:ns:geopriv:conf . . . . . . . . . . . 30 8.2. XML Schema Registration . . . . . . . . . . . . . . . . . 30 9. Acknowledgements . . . . . . . . . . . . . . . . . . . . . . . 31 Appendix A. Conversion Between Cartesian and Geodetic Coordinates . . . . . . . . . . . . . . . . . . . . . 32 Appendix B. Calculating the Upward Normal of a Polygon . . . . . 34 10. References . . . . . . . . . . . . . . . . . . . . . . . . . . 35 10.1. Normative References . . . . . . . . . . . . . . . . . . . 35 Thomson & Winterbottom Expires December 7, 2008 [Page 2] Internet-Draft Uncertainty & Confidence June 2008 10.2. Informative References . . . . . . . . . . . . . . . . . . 35 Authors' Addresses . . . . . . . . . . . . . . . . . . . . . . . . 37 Intellectual Property and Copyright Statements . . . . . . . . . . 38 Thomson & Winterbottom Expires December 7, 2008 [Page 3] Internet-Draft Uncertainty & Confidence June 2008 1. Introduction Location information represents an estimation of the position of a Target. Under ideal circumstances, a location estimate precisely reflects the actual location of the Target. In reality, there are many factors that introduce errors into the measurements that are used to determine location estimates. The process by which measurements are combined to generate a location estimate is outside of the scope of work within the IETF. However, the results of such a process are carried in IETF data formats and protocols. This document outlines how uncertainty, and its associated datum, confidence, are expressed and interpreted. The goal of this document is to provide a common nomenclature for discussing uncertainty. An xml format for expressing confidence, a datum previously inexpressible in the Presence Information Data Format - Location Object (PIDF-LO), is defined. This document also provides guidance on how to use location information that includes uncertainty. Methods for expanding or reducing uncertainty to obtain a required level of confidence are described. Methods for determining the probability that a Target is within a specified region based on their location estimate are described. These methods are simplified by making certain assumptions about the location estimate and are designed to be applicable to location estimates in a relatively small area. 1.1. Conventions and Terminology This document assumes a basic understanding of the principles of mathematics, particularly statistics and geometry. Some terminology is borrowed from [RFC3693]. Mathematical formulae are presented using the following notation: add "+", subtract "-", multiply "*", divide "/", power "^" and absolute value "|x|". Precedence is indicated using parentheses. Mathematical functions are represented by common abbreviations: square root "sqrt", sine "sin", cosine "cos", inverse cosine "acos", tangent "tan", inverse tangent "atan", inverse error function "erfinv". The key words "MUST", "MUST NOT", "REQUIRED", "SHALL", "SHALL NOT", "SHOULD", "SHOULD NOT", "RECOMMENDED", "MAY", and "OPTIONAL" in this document are to be interpreted as described in [RFC2119]. Thomson & Winterbottom Expires December 7, 2008 [Page 4] Internet-Draft Uncertainty & Confidence June 2008 2. A General Definition of Uncertainty and Confidence Uncertainty, as a general concept, is a product of the limitations of measurement. In measuring any observable quantity, errors from a range of sources affect the result. When quantifying the impact of measurement errors, two values are used. The first value expresses the magnitude of the possible error, which is the estimated _uncertainty_ value. Uncertainty is most often expressed as a range in the same units as the result. The second value is _confidence_, which estimates the probability that the true value lies within the extents defined by the uncertainty. In the following example, the result is shown with a range specified by a nominal value and an uncertainty value. e.g. x = 1.00742 +/- 0.0043 meters at 95% confidence In other words, the true value of "x" is 95% likely to be between 1.00312 and 1.01172 meters. Uncertainty and confidence for location estimates can be derived in a number of ways. It is out of the scope of this document to describe methods for determining uncertainty. [ISO.GUM] and [NIST.TN1297] provide guidelines for managing and manipulating measurement uncertainty. 2.1. Uncertainty as a Probability Distribution It is helpful to think of the uncertainty and confidence as defining a probability density function (PDF). The probability density indicates the probability that the true value lies at any one point. The shape of the probability distribution depends on the method that is used to determine the result. Two probability density functions are considered in this document: o The normal PDF (also referred to as a Gaussian PDF) is used where a large number of small random factors contribute to errors. The value used for uncertainty in a normal PDF is related to the standard deviation of the distribution. o A rectangular PDF is used where the errors are known to be consistent across a limited range. The value used for uncertainty where a rectangular PDF is known is the half-width of the distribution; that is, half the width of the distribution. Each of these probability density functions can be characterized by its center point, or mean, and its width. For a normal distribution, Thomson & Winterbottom Expires December 7, 2008 [Page 5] Internet-Draft Uncertainty & Confidence June 2008 uncertainty and confidence together are related to the standard deviation (see Section 4.2). For a rectangular distribution, half of the width of the distribution is used. Figure 1 shows a normal and rectangular probability density function with the mean (m) and standard deviation (s) labelled. The half- width (h) of the rectangular distribution is also indicated. ***** *** Normal PDF ** : ** --- Rectangular PDF ** : ** ** : ** ,---------*---------------*---------. | ** : ** | | ** : ** | | * <-- s -->: * | | * : : : * | | ** : ** | | * : : : * | | * : * | |** : : : **| ** : ** *** | : : : | *** ***** | :<------ h ------>| ***** .****-------+.......:.........:.........:.......+-------*****. m Figure 1: Normal and Rectangular Probability Density Functions In relation to a PDF, uncertainty represents a certain range of values and confidence is the probability that the true value is found within that range. Confidence is defined as the integral of the PDF over the range represented by the uncertainty. The probability of the actual value falling between two points is found by finding the area under the curve between the points (that is, the integral of the curve between the points). For any given PDF, the area under the curve for the entire range from negative infinity to positive infinity is 1 or (100%). Therefore, the confidence over any interval of uncertainty is always less than 100%. Figure 2 shows how confidence is determined for a normal distribution. The area of the shaded region gives the confidence (c) for the interval between "m-u" and "m+u". Thomson & Winterbottom Expires December 7, 2008 [Page 6] Internet-Draft Uncertainty & Confidence June 2008 ***** **:::::** **:::::::::** **:::::::::::** *:::::::::::::::* **:::::::::::::::** **:::::::::::::::::** *:::::::::::::::::::::* *:::::::::::::::::::::::* **:::::::::::::::::::::::** *:::::::::::: c ::::::::::::* *:::::::::::::::::::::::::::::* **|:::::::::::::::::::::::::::::|** ** |:::::::::::::::::::::::::::::| ** *** |:::::::::::::::::::::::::::::| *** ***** |:::::::::::::::::::::::::::::| ***** .****..........!:::::::::::::::::::::::::::::!..........*****. | | | (m-u) m (m+u) Figure 2: Confidence as the Integral of a PDF It can be seen from these diagrams that, when expressing uncertainty, the value for uncertainty is the range of values and confidence is the probability that the true value is found within that range. In Section 4.2, methods are described for manipulating uncertainty and confidence if the shape of the PDF is known. 2.2. Deprecation of the Terms Precision and Resolution The terms _Precision_ and _Resolution_ are defined in RFC 3693 [RFC3693]. These definitions were intended to provide a common nomenclature for discussing uncertainty; however, these particular terms have many different uses in other fields and their definitions are not sufficient to avoid confusion about their meaning. These terms MUST NOT be used in relation to quantitative concepts when discussing uncertainty and confidence in relation to location information. 2.3. Accuracy as a Qualitative Concept Uncertainty and confidence are quantitative concepts. The term _Accuracy_ is useful in describing, qualitatively, the general concepts of location information. Accuracy MAY be used as a general term when describing location estimates. Accuracy MUST NOT be used in a quantitative context. Thomson & Winterbottom Expires December 7, 2008 [Page 7] Internet-Draft Uncertainty & Confidence June 2008 For instance, it could be appropriate to say that a location estimate with uncertainty "X" is more accurate than a location estimate with uncertainty "2X" at the same confidence. It is not appropriate to assign a number to "accuracy", nor is it appropriate to refer to any component of uncertainty or confidence as "accuracy". That is, to say that the "accuracy" for the first location estimate is "X" would be an erroneous use of this term. Thomson & Winterbottom Expires December 7, 2008 [Page 8] Internet-Draft Uncertainty & Confidence June 2008 3. Uncertainty in Location A _location estimate_ is the result of location determination. A location estimate is subject to uncertainty like any other observation. However, unlike a simple measure of a one dimensional property like length, a location estimate is specified in two or three dimensions. Uncertainty in a single dimension is expressed as a range; that is, a length of uncertainty in one dimension. Locations in two or three dimensional space are expressed as a subset of that space, either an area or volume of uncertainty. In simple terms, areas or volumes can be formed by the combination of two or three ranges, or more complex shapes could be described. This document uses the term _region of uncertainty_ to refer to the uncertainty of a location estimate expressed either as an area or volume. 3.1. Representation of Uncertainty and Confidence in PIDF-LO A set of shapes that can be used for the expression of uncertainty in location estimates are described in [GeoShape]. These shapes are the recommended form for the representation of uncertainty in PIDF-LO [RFC4119] documents. However, these shapes do not include an indication of confidence. A schema defining a confidence element is included in Section 6. This element also includes an optional parameter that defines the PDF. Absence of uncertainty information in a PIDF-LO document does not indicate that there is no uncertainty in the location estimate. Uncertainty might not have been calculated for the estimate, or it may be withheld for privacy purposes. The confidence element is included within the "location-info" element of the PIDF-LO. The PIDF-LO document in Figure 3 includes a representation of uncertainty as a circular area. The confidence element (on the line marked with a comment) indicates that the confidence is 67% and that it follows a normal distribution. Thomson & Winterbottom Expires December 7, 2008 [Page 9] Internet-Draft Uncertainty & Confidence June 2008 42.5463 -73.2512 850.24 67 mac:010203040506 Figure 3: Example PIDF-LO with Confidence and Uncertainty Where uncertainty information is provided, but the confidence element is not, the confidence is assumed to be 95% [I-D.ietf-geopriv-pdif-lo-profile]. If only a point is included, confidence is 0% and the confidence element SHOULD be omitted. Three probability distribution functions can be described using the confidence parameter. The "pdf" attribute value SHOULD only be included if known, but it is acknowledged that each PDF is an approximation only - as are all values relating to uncertainty. The PDF is normal if there are a large number of small, independent sources of error; and rectangular if all points within the area have roughly equal probability of being the actual location of the Target; otherwise, the PDF MUST be set to unknown. In order to support the functions provided in this document, Location Generators MUST ensure that confidence is equal in each dimension when generating location information. See Section 4.2 for more details. Thomson & Winterbottom Expires December 7, 2008 [Page 10] Internet-Draft Uncertainty & Confidence June 2008 3.2. Uncertainty and Confidence for Civic Addresses Civic addresses [RFC5139] inherently include uncertainty, based on the area of the most precise element that is specified. Uncertainty is effectively defined by the presence or absence of elements -- elements that are not present are deemed to be uncertain. Indicating confidence for a civic address is useful, however values of other than the default (95%) are not expected and manipulation of a civic address based on confidence is difficult. It is RECOMMENDED that confidence not be indicated for civic addresses and that the default of 95% is always assumed. The methods described in Section 4.2 for manipulating uncertainty do not apply to civic location information. Uncertainty MAY be increased by removing elements, but unless additional confidence information is available, confidence MUST NOT be increased as a consequence. 3.3. DHCP Location Configuration Information and Uncertainty Location information is often measured in two or three dimensions; expressions of uncertainty in one dimension only are rare. The "resolution" parameters in [RFC3825] provide an indication of uncertainty in one dimension. [RFC3825] defines a means for representing uncertainty, but a value for confidence is not specified. A default value of 95% confidence can be assumed for the combination of the uncertainty on each axis. That is, the confidence of the resultant rectangular polygon or prism is 95%. The PDF for a DHCP result is unknown. Thomson & Winterbottom Expires December 7, 2008 [Page 11] Internet-Draft Uncertainty & Confidence June 2008 4. Manipulation of Uncertainty This section deals with manipulation of location information that contains uncertainty. The following rules generally apply when manipulating location information: o Where calculations are performed on coordinate information, these should be performed in Cartesian space and the results converted back to latitude, longitude and altitude. A method for converting to and from Cartesian coordinates is included in Appendix A. o Normal rounding rules do not apply when rounding uncertainty. When rounding, uncertainty is always rounded up and confidence is always rounded down (see [NIST.TN1297]). Note that manipulating uncertainty uses non-reversible operations and that each manipulation can result in the loss of some information. 4.1. Reduction of a Location Estimate to a Point Manipulating location estimates that include uncertainty information requires additional complexity in systems. In some cases, systems only operate on definitive values, that is, a single point. This section describes algorithms for reducing location estimates to a simple form without uncertainty information. Having a consistent means for reducing location estimates allows for interaction between applications that are able to use uncertainty information and those that cannot. Note: Reduction of a location estimate to a point constitutes a reduction in information. Removing uncertainty information can degrade results in some applications. Also, there is a natural tendency to misinterpret a point location as representing a location without uncertainty. This could lead to more serious errors. Therefore, these algorithms should only be applied where necessary. Several different approaches can be taken when reducing a location estimate to a point; each method is equally valid, depending on the assumptions that are made. For any given region of uncertainty, selecting an arbitrary point within the area could be considered valid; however, given the aforementioned problems with point locations, a more rigorous approach is appropriate. Given a result with a known distribution, selecting the point within the area that has the highest probability is a more rigorous method. Thomson & Winterbottom Expires December 7, 2008 [Page 12] Internet-Draft Uncertainty & Confidence June 2008 Alternatively, a point could be selected that minimizes the probable error. For a rectangular distribution, the centroid of the area or volume minimizes error. Minimizing the error for a normal distribution is more difficult, but assuming that the normal distribution is centered in the region, the centroid is also the point with highest probability. In order to reduce a region of uncertainty to a single point, the centroid of the region is found. A location estimate that is represented as a point has a confidence of 0%, so no confidence information is retained if this conversion is performed. 4.1.1. Centroid Calculation For regular shapes, such as Circle, Sphere, Ellipse and Ellipsoid, this approach equates to the center point of the region. For regions of uncertainty that are expressed as regular (for instance, rectangular) Polygons and Prisms the center point is also the most appropriate selection. For the Arc-Band shape and non-regular Polygons and Prisms, selecting the centroid of the area or volume minimizes the overall error. This assumes a rectangular distribution; the difference arising from different distributions is considered acceptable. Note that the centroid of a Polygon or Arc-Band shape is not necessarily within the region of uncertainty. 4.1.1.1. Arc-Band Centroid The centroid of the Arc-Band shape is found along a line that bisects the arc. The centroid can be found at the following distance from the starting point of the arc-band (assuming an arc-band with an inner radius of "r", outer radius "R", start angle "a", and opening angle "o"): d = 4 * sin(o/2) * (R*R + R*r + r*r) / (3*o*(R + r)) This point can be found along the line that bisects the arc; that is, the line at an angle of "a + (o/2)". Negative values are possible if the angle of opening is greater than 180 degrees; negative values indicate that the centroid is found along the angle "a + (o/2) + 180". 4.1.1.2. Polygon Centroid Calculating a centroid for the Polygon and Prism shapes is more complex. Polygons that are specified using geodetic coordinates are Thomson & Winterbottom Expires December 7, 2008 [Page 13] Internet-Draft Uncertainty & Confidence June 2008 not necessarily coplanar. For Polygons that are specified without an altitude, choose a value for altitude before attempting this process; an altitude of 0 is acceptable. The method described in this section is simplified by assuming that the surface of the earth is locally flat. This method degrades as polygons become larger; see [GeoShape] for recommendations on polygon size. The polygon is translated to a new coordinate system that has an x-y plane roughly parallel to the polygon. This enables the elimination of z-axis values and calculating a centroid can be done using only x and y coordinates. This requires that the upward normal for the polygon is known. To translate the polygon coordinates, apply the process described in Appendix B to find the normal vector "N = [Nx,Ny,Nz]". From this vector, select two vectors that are perpendicular to this vector and combine these into a transformation matrix. If "Nx" and "Ny" are non-zero, the vectors in Figure 4 can be used, given "p = sqrt(Nx^2 + Ny^2)". More transformations are provided later in this section for cases where "Nx" or "Ny" are zero. [ -Ny/p Nx/p 0 ] [ -Ny/p -Nx*Nz/p Nx ] T = [ -Nx*Nz/p -Ny*Nz/p p ] T' = [ Nx/p -Ny*Nz/p Ny ] [ Nx Ny Nz ] [ 0 p Nz ] (Transform) (Reverse Transform) Figure 4: Recommended Transformation Matrices To apply a transform to each point in the polygon, form a matrix from the ECEF coordinates and use matrix multiplication to determine the translated coordinates. [ -Ny/p Nx/p 0 ] [ x[1] x[2] x[3] ... x[n] ] [ -Nx*Nz/p -Ny*Nz/p p ] * [ y[1] y[2] y[3] ... y[n] ] [ Nx Ny Nz ] [ z[1] z[2] z[3] ... z[n] ] [ x'[1] x'[2] x'[3] ... x'[n] ] = [ y'[1] y'[2] y'[3] ... y'[n] ] [ z'[1] z'[2] z'[3] ... z'[n] ] Figure 5: Transformation Alternatively, direct multiplication can be used to achieve the same result: Thomson & Winterbottom Expires December 7, 2008 [Page 14] Internet-Draft Uncertainty & Confidence June 2008 x'[i] = -Ny * x[i] / p + Nx * y[i] / p y'[i] = -Nx * Nz * x[i] / p - Ny * Nz * y[i] / p + p * z[i] z'[i] = Nx * x[i] + Ny * y[i] + Nz * z[i] The first and second rows of this matrix ("x'" and "y'") contain the values that are used to calculate the centroid of the polygon. To find the centroid of this polygon, first find the area using: A = sum from i=1..n of (x'[i]*y'[i+1]-x'[i+1]*y'[i]) / 2 For these formulae, treat each set of coordinates as circular, that is "x'[0] == x'[n]" and "x'[n+1] == x'[1]". Based on the area, the centroid along each axis can be determined by: Cx' = sum (x'[i]+x'[i+1]) * (x'[i]*y'[i+1]-x'[i+1]*y'[i]) / (6*A) Cy' = sum (y'[i]+y'[i+1]) * (x'[i]*y'[i+1]-x'[i+1]*y'[i]) / (6*A) The third row contains a distance from a plane parallel to the polygon. If the polygon is coplanar, then the values for "z'" are identical; however, the constraints recommended in [I-D.ietf-geopriv-pdif-lo-profile] mean that this is rarely the case. To determine "Cz'", average these values: Cz' = sum z'[i] / n Once the centroid is known in the transformed coordinates, these can be transformed back to the original coordinate system. The reverse transformation is shown in Figure 6. [ -Ny/p -Nx*Nz/p Nx ] [ Cx' ] [ Cx ] [ Nx/p -Ny*Nz/p Ny ] * [ Cy' ] = [ Cy ] [ 0 p Nz ] [ sum of z'[i] / n ] [ Cz ] Figure 6: Reverse Transformation The reverse transformation can be applied directly as follows: Cx = -Ny * Cx' / p - Nx * Nz * Cy' / p + Nx * Cz' Cy = Nx * Cx' / p - Ny * Nz * Cy' / p + Ny * Cz' Cz = p * Cy' + Nz * Cz' The ECEF value "[Cx,Cy,Cz]" can then be converted back to geodetic coordinates. Given a polygon that is defined with no altitude or Thomson & Winterbottom Expires December 7, 2008 [Page 15] Internet-Draft Uncertainty & Confidence June 2008 equal altitudes for each point, the altitude of the result is reset after converting back to a geodetic value. The centroid of the Prism shape is found by finding the centroid of the base polygon and raising the point by half the height of the prism. This can be added to altitude of the final result; alternatively, this can be added to "Cz'", which ensures that negative height is correctly applied to polygons that are defined in a "clockwise" direction. The recommended transforms only apply if "Nx" and "Ny" are non-zero. If the normal vector is "[0,0,1]" (that is, along the z-axis), then no transform is necessary. Similarly, if the normal vector is "[0,1,0]" or "[1,0,0]", avoid the transformation and use the x and z coordinates or y and z coordinates (respectively) in the centroid calculation phase. If either "Nx" or "Ny" are zero, the alternative transform matrices in Figure 7 can be used. The reverse transform is the transpose of this matrix. if Nx == 0: | if Ny == 0: [ 0 -Nz Ny ] [ 0 1 0 ] | [ -Nz 0 Nx ] T = [ 1 0 0 ] T' = [ -Nz 0 Ny ] | T = [ 0 1 0 ] = T' [ 0 Ny Nz ] [ Ny 0 Nz ] | [ Nx 0 Nz ] Figure 7: Alternative Transformation Matrices 4.1.1.3. Conversion to Circle or Sphere The Circle or Sphere are simple shapes that suit a range of applications. A circle or sphere contains fewer units of data to manipulate, which simplifies operations on location estimates. The simplest method for converting a location estimate to a Circle or Sphere shape is to select a center point and find the longest distance to any point in the region of uncertainty to that point. This distance can be determined based on the shape type: Circle/Sphere: No conversion necessary. Ellipse/Ellipsoid: The greater of either semi-major axis or altitude uncertainty. Polygon/Prism: The distance to the furthest vertex of the polygon (for a Prism, only check points on the base). Thomson & Winterbottom Expires December 7, 2008 [Page 16] Internet-Draft Uncertainty & Confidence June 2008 Arc-Band: The furthest length from the centroid to the points where the inner and outer arc end. This distance can be calculated by finding the larger of the two following formulae: X = sqrt( ( d - R*cos(o/2) )^2 + R*sin(o/2)^2 ) x = sqrt( ( d - r*cos(o/2) )^2 + r*sin(o/2)^2 ) Once the Circle or Sphere shape is found, the associated confidence can be increased if the result is known to follow a normal distribution. However, this is a complicated process and provides limited benefit. In many cases it also violates the constraint that confidence in each dimension be the same. It is RECOMMENDED that confidence is unchanged when performing this conversion. Two dimensional shapes are converted to a Circle; three dimensional shapes are converted to a Sphere. The PDF for a converted shape SHOULD be set to "unknown". A Sphere shape can be easily converted to a Circle shape by removing the altitude component. The altitude is unspecified for a Circle and therefore has unlimited uncertainty. Therefore, the confidence for the Circle is higher than the Sphere. If desired, the confidence of the circle can be increased using the following approximate formula: C[circle] >= C[sphere] ^ (2/3) "C[circle]" is the confidence of the circle and "C[sphere]" is the confidence of the sphere. For example, a Sphere with a confidence of 95% is simplified to a Circle of equal radius with confidence of 96.6%. 4.2. Increasing and Decreasing Uncertainty and Confidence The combination of uncertainty and confidence provide a great deal of information about the nature of the data that is being measured. If both uncertainty, confidence and PDF are known, certain information can be extrapolated. In particular, the uncertainty can be scaled to meet a certain confidence or the confidence for a particular region of uncertainty can be found. In general, confidence decreases as the region of uncertainty decreases in size and confidence increases as the region of uncertainty increases in size. However, this depends on the PDF. If the region of uncertainty is increased, confidence might increase as result, but only if the PDF is normal. If the region of uncertainty is increased during the process of obfuscation (see Section 4.4), then the confidence MUST NOT be increased. If the region of Thomson & Winterbottom Expires December 7, 2008 [Page 17] Internet-Draft Uncertainty & Confidence June 2008 uncertainty is reduced in size, then the confidence MUST be decreased accordingly. If the PDF is not known, uncertainty and confidence cannot be modified. Uncertainty can be increased, but only if confidence is not increased. 4.2.1. Rectangular Distributions Uncertainty that follows a rectangular distribution can only be decreased in size. Since the PDF is constant over the region of uncertainty, the resulting confidence is determined by the following formula: Cr = Co * Ur / Uo Where "Uo" and "Ur" are the sizes of the original and reduced regions of uncertainty (either the area or the volume of the region); "Co" and "Cb" are the confidence values associated with each region. Information is lost by decreasing the region of uncertainty for a rectangular distribution. Once reduced in size, the uncertainty region cannot subsequently be increased in size. 4.2.2. Normal Distributions Uncertainty and confidence can be both increased and decreased for a normal distribution. However, the process is more complicated. For a normal distribution, uncertainty and confidence are related to the standard deviation of the function. The following function defines the relationship between standard deviation, uncertainty and confidence along a single axis: S[x] = U[x] / ( sqrt(2) * erfinv(C[x]) ) Where "S[x]" is the standard deviation, "U[x]" is the uncertainty and "C[x]" is the confidence along a single axis. "erfinv" is the inverse error function. Scaling a normal distribution in two dimensions requires several assumptions. Firstly, it is assumed that the distribution along each axis is independent. Secondly, the confidence for each axis is the same. Therefore, the confidence along each axis can be assumed to be: C[x] = Co ^ (1/n) Thomson & Winterbottom Expires December 7, 2008 [Page 18] Internet-Draft Uncertainty & Confidence June 2008 Where "C[x]" is the confidence along a single axis and "Co" is the overall confidence and "n" is the number of dimensions in the uncertainty. Therefore, to find the uncertainty for each axis at a desired confidence, "Cd", apply the following formula: Ud[x] <= U[x] * (erfinv(Cd ^ (1/n)) / erfinv(Co ^ (1/n))) For regular shapes, this formula can be applied as a scaling factor in each dimension to reach a required confidence. 4.3. Determining Whether a Location is Within a Given Region A number of applications require that a judgement be made about whether a Target is within a given region of interest. Given a location estimate with uncertainty, this judgement can be difficult. A location estimate represents a probability distribution, and the true location of the Target cannot be definitively known. Therefore, the judgement relies on determining the probability that the Target is within the region. The probability that the Target is within a particular region is found by integrating the PDF over the region. For a normal distribution, there are no analytical methods that can be used to determine the integral of the two or three dimensional PDF over an arbitrary region. The complexity of numerical methods is also too great to be useful in many applications; for example, finding the integral of the PDF in two or three dimensions across the overlap between the uncertainty region and the target region. If the PDF is unknown, no determination can be made. When judging whether a location is within a given region, uncertainties using these PDFs MAY be assumed to be rectangular. If this assumption is made, the confidence SHOULD be scaled to 95%, if possible. Note: The selection of confidence has a significant impact on the final result. Only use a different confidence if an uncertainty value for 95% confidence cannot be found. Given the assumption of a rectangular distribution, the probability that a Target is found within a given region is found by first finding the area (or volume) of overlap between the uncertainty region and the region of interest. This is multiplied by the confidence of the location estimate to determine the probability. Figure 8 shows an example of finding the area of overlap between the region of uncertainty and the region of interest. Thomson & Winterbottom Expires December 7, 2008 [Page 19] Internet-Draft Uncertainty & Confidence June 2008 _.-""""-._ .' `. _ Region of / \ / Uncertainty ..+-"""--.. | .-' | :::::: `-. | ,' | :: Ao ::: `. | / \ :::::::::: \ / / `._ :::::: _.X | `-....-' | | | | | \ / `. .' \_ Region of `._ _.' Interest `--..___..--' Figure 8: Area of Overlap Between Two Circular Regions Once the area of overlap, "Ao", is known, the probability that the Target is within the region of interest, "Pi", is: Pi = Co * Ao / Au Given that the area of the region of uncertainty is "Au" and the confidence is "Co". Specific applications SHOULD make recommendations about the probability required for conditions. Without specific recommendations, it is RECOMMENDED that the probability be greater than 50% before a decision is made. If a choice of regions of interest is necessary, as is required by [I-D.ietf-ecrit-lost], then the region with the highest probability is selected. 4.3.1. Determining the Area of Overlap for Two Circles Determining the area of overlap between two arbitrary shapes is a non-trivial process. Reducing areas to circles (see Section 4.1.1.3) enables the application of the following process. Given the radius of the first circle "r", the radius of the second circle "R" and the distance between their center points "d", the following set of formulas provide the area of overlap "Ao". o If the circles don't overlap, that is "d >= r+R", "Ao" is zero. o If one of the two circles is entirely within the other, that is "d <= |r-R|", the area of overlap is the area of the smaller circle. Thomson & Winterbottom Expires December 7, 2008 [Page 20] Internet-Draft Uncertainty & Confidence June 2008 o Otherwise, if the circles partially overlap, that is "d < r+R" and "d > |r-R|", find "Ao" using: a = (r^2 - R^2 + d^2)/(2*d) Ao = r^2*acos(a/r) + R^2*acos((d - a)/R) - d*sqrt(r^2 - a^2) A value for "d" can be determined by converting the center points to Cartesian coordinates. However, given the inherent imprecision of this method, approximate techniques based on unconverted values MAY be used. 4.4. Obfuscation of Location Estimates for Privacy Reasons [RFC3693] and [RFC3694] describe operations on location information that obscure the real location of a Target to protect privacy. Typically, obfuscation methods operate on a single point and don't allow for the associated region of uncertainty. This section describes a method that extends single point methods, while the confidence is retained by increasing the size of the region of uncertainty. Single point obfuscation methods rely on moving the point by a constrained distance. The maximum distance is set by preference, but the actual distance chosen varies randomly, or, as in [I-D.ietf-geopriv-policy], the distance is set by finding the nearest multiple of the inverse of the input value. To obfuscate a location estimate that contains uncertainty information the following procedure can be used: 1. Optionally, the shape could be translated to a Circle or Sphere shape. This simplifies later steps, but could be considered additional obfuscation. 2. Any single point within the region of uncertainty is chosen. This could be the centroid, but any point can be selected. 3. That point is moved using the chosen method of obfuscation. 4. Based on the movement of the point, the entire region of uncertainty is moved in the same direction and by the same distance. For most shapes, this only requires the movement of a single point to achieve; whereas each point of a Polygon needs to be moved in the same direction and by the same distance to ensure that the shape is retained. Thomson & Winterbottom Expires December 7, 2008 [Page 21] Internet-Draft Uncertainty & Confidence June 2008 5. The region of uncertainty is expanded. In each dimension, the region of uncertainty is expanded by the maximum distance that the point could have moved. This expansion is done in both directions for each axis. The expanded region therefore includes the original region of uncertainty. 6. The PDF is changed to unknown; the confidence is unchanged. This process ensures that no information about the original region of uncertainty is revealed but the confidence for the final estimate is the same as the original. For the method described in [I-D.ietf-geopriv-policy], the maximum distance SHOULD be calculated at the equator. That is, the maximum distance is given for two-dimensional and three-dimensional coordinates is: 2dmax = sqrt(2)*(6378137*pi) /(r*180) 3dmax = sqrt(2 * ((6378137*pi) / (r*180))^2 + (1/r)^2) This method is functionally equivalent to civic address obfuscation that relies on removing the most specific elements, thereby increasing uncertainty. Thomson & Winterbottom Expires December 7, 2008 [Page 22] Internet-Draft Uncertainty & Confidence June 2008 5. Examples This section presents some examples of how to apply the methods described in Section 4. 5.1. Reduction to a Point or Circle Alice receives a location estimate from her LIS that contains a ellipsoidal region of uncertainty. This information is provided at 19% confidence with a normal PDF. A PIDF-LO extract for this information is shown in Figure 9. -34.407242 150.882518 34 7.7156 3.31 28.7 43 19 Figure 9 This information can be reduced to a point simply by extracting the center point, that is [-34.407242, 150.882518, 34]. Confidence is not applicable to values without uncertainty, so this information is no longer useful. If some limited uncertainty were required, the estimate could be converted into a circle or sphere. To convert to a sphere, the radius is the largest of the semi-major, semi-minor and vertical axes; in this case, 28.7 meters. The confidence remains at 19%; and the PDF becomes unknown. However, if only a circle is required, the altitude can be dropped as Thomson & Winterbottom Expires December 7, 2008 [Page 23] Internet-Draft Uncertainty & Confidence June 2008 can the altitude uncertainty (the vertical axis of the ellipsoid), resulting in a circle at [-34.407242, 150.882518] of radius 7.7156 meters. The confidence of the circle can be expanded to 33%. Bob receives a location estimate with a Polygon shape. This information is shown in Figure 10. No confidence element is present in the PIDF-LO, so Bob can assume 95% confidence with an unknown distribution. -33.856625 151.215906 -33.856299 151.215343 -33.856326 151.214731 -33.857533 151.214495 -33.857720 151.214613 -33.857369 151.215375 -33.856625 151.215906 Figure 10 To convert this to a polygon, each point is firstly assigned an altitude of zero and converted to ECEF coordinates (see Appendix A). Then a normal vector for this polygon is found (see Appendix B). The results of each of these stages is shown in Figure 11. Note that the numbers shown are all rounded; no rounding is possible during this process since rounding would contribute significant errors. Thomson & Winterbottom Expires December 7, 2008 [Page 24] Internet-Draft Uncertainty & Confidence June 2008 Polygon in ECEF coordinate space (repeated point omitted and transposed to fit): [ -4.6470e+06 2.5530e+06 -3.5333e+06 ] [ -4.6470e+06 2.5531e+06 -3.5332e+06 ] pecef = [ -4.6470e+06 2.5531e+06 -3.5332e+06 ] [ -4.6469e+06 2.5531e+06 -3.5333e+06 ] [ -4.6469e+06 2.5531e+06 -3.5334e+06 ] [ -4.6469e+06 2.5531e+06 -3.5333e+06 ] Normal Vector: n = [ -0.72782 0.39987 -0.55712 ] Transformation Matrix: [ -0.48152 -0.87643 0.00000 ] t = [ -0.48828 0.26827 0.83043 ] [ -0.72782 0.39987 -0.55712 ] Transformed Coordinates: [ 8.3206e+01 1.9809e+04 6.3715e+06 ] [ 3.1107e+01 1.9845e+04 6.3715e+06 ] pecef' = [ -2.5528e+01 1.9842e+04 6.3715e+06 ] [ -4.7367e+01 1.9708e+04 6.3715e+06 ] [ -3.6447e+01 1.9687e+04 6.3715e+06 ] [ 3.4068e+01 1.9726e+04 6.3715e+06 ] Two dimensional polygon area: A = 12600 m^2 Two-dimensional polygon centroid: C' = [ 8.8184e+00 1.9775e+04 ] Average of pecef' z coordinates: 6.3715e+06 Reverse Transformation Matrix: [ -0.48152 -0.48828 -0.72782 ] t' = [ -0.87643 0.26827 0.39987 ] [ 0.00000 0.83043 -0.55712 ] Polygon centroid (ECEF): C = [ -4.6470e+06 2.5531e+06 -3.5333e+06 ] Polygon centroid (Geo): Cg = [ -33.856926 151.215102 -4.9537e-04 ] Figure 11 The point conversion for the polygon uses the final result, "Cg", ignoring the altitude since the original shape did not include altitude. To convert this to a circle, take the maximum distance in ECEF coordinates from the center point to each of the points. This results in a radius of 99.1 meters. Confidence for this shape follows the original confidence of 95%. Thomson & Winterbottom Expires December 7, 2008 [Page 25] Internet-Draft Uncertainty & Confidence June 2008 5.2. Increasing and Decreasing Confidence The confidence associated with Alice's location estimate is quite low for many applications. Since the estimate is known to follow a normal distribution, the method in Section 4.2.2 can be used. Each axis can be scaled by: scale = erfinv(0.95^(1/3)) / erfinv(0.19^(1/3)) = 2.9937 Ensuring that rounding always increases uncertainty, the location estimate at 95% includes a semi-major axis of 23.1, a semi-minor axis of 10 and a vertical axis of 86. Bob's location estimate covers an area of approximately 12600 square meters. If the estimate follows a rectangular distribution, the region of uncertainty can be reduced in size. To find the confidence that he is within the smaller area of the concert hall, given by the polygon [-33.856473, 151.215257; -33.856322, 151.214973; -33.856424, 151.21471; -33.857248, 151.214753; -33.857413, 151.214941; -33.857311, 151.215128]. To use this new region of uncertainty, find its area using the same translation method described in Section 4.1.1.2, which is 4566.2 square meters. The confidence associated with the smaller area is therefore 95% * 4566.2 / 12600 = 34%. 5.3. Matching Location Estimates to Regions of Interest Suppose than a circular area is defined centered at [-33.872754, 151.20683] with a radius of 1950 meters. To determine whether Bob is found within this area, we apply the method in Section 4.3. Using the converted Circle shape for Bob's location, the distance between these points is found to be 1915.26 meters. The area of overlap between Bob's location estimate and the region of interest is therefore 2209 square meters and the area of Bob's location estimate is 30853 square meters. This gives the probability that Bob is less than 1950 meters from the selected point as 67.8%. Note that if 1920 meters were chosen for the distance from the selected point, the area of overlap is only 16196 square meters and the confidence is 49.8%. Therefore, it is more likely that Bob is outside the region of interest, despite the center point of his location estimate being within the region. 5.4. Obfuscating Location Estimates Alices's Location Server (LS, see [RFC3693]) provides her location estimate to a Location Recipient (LR), but the ruleset (see [I-D.ietf-geopriv-policy]) that Alice has provided includes an Thomson & Winterbottom Expires December 7, 2008 [Page 26] Internet-Draft Uncertainty & Confidence June 2008 geodetic transformation. The rule states that the location information is obscured by "r = 100". Too apply this rule, a single point is chosen. In this case the center point, [-34.407242, 150.882518, 34], is used. The result of applying the transformation is the point [-34.41, 150.88, 34]. The maximum distance that this transform could shift a three dimensional point is 1574.3 meters. The actual distance moved is 383.7 meters, but including this information could reveal too more about the Alice's position than she might desire. Therefore, the transformed location estimate (given with a confidence of 95%) is shown in Figure 12. -34.41 150.88 34 1597.4 1584.3 1660.3 43 Figure 12 Thomson & Winterbottom Expires December 7, 2008 [Page 27] Internet-Draft Uncertainty & Confidence June 2008 6. Confidence Schema PIDF-LO Confidence This schema defines an element that is used for indicating confidence in PIDF-LO documents. Thomson & Winterbottom Expires December 7, 2008 [Page 28] Internet-Draft Uncertainty & Confidence June 2008 7. Security Considerations This document describes a parameter that is added to a PIDF-LO. This additional information MUST be treated with the same privacy considerations as location information. See [RFC4119] for details on privacy considerations for location information. No specific security considerations arise from the algorithms described in this document. Thomson & Winterbottom Expires December 7, 2008 [Page 29] Internet-Draft Uncertainty & Confidence June 2008 8. IANA Considerations 8.1. URN Sub-Namespace Registration for urn:ietf:params:xml:ns:geopriv:conf This section registers a new XML namespace, "urn:ietf:params:xml:ns:geopriv:conf", as per the guidelines in [RFC3688]. URI: urn:ietf:params:xml:ns:geopriv:conf Registrant Contact: IETF, GEOPRIV working group, (geopriv@ietf.org), Martin Thomson (martin.thomson@andrew.com). XML: BEGIN PIDF-LO Confidence Attribute

Namespace for PIDF-LO Confidence Attribute

urn:ietf:params:xml:ns:geopriv:conf

[[NOTE TO IANA/RFC-EDITOR: Please update RFC URL and replace XXXX with the RFC number for this specification.]]

See RFCXXXX.

END 8.2. XML Schema Registration This section registers an XML schema as per the guidelines in [RFC3688]. URI: urn:ietf:params:xml:schema:geopriv:conf Registrant Contact: IETF, GEOPRIV working group, (geopriv@ietf.org), Martin Thomson (martin.thomson@andrew.com). Schema: The XML for this schema can be found as the entirety of Section 6 of this document. Thomson & Winterbottom Expires December 7, 2008 [Page 30] Internet-Draft Uncertainty & Confidence June 2008 9. Acknowledgements Thanks go to Peter Rhodes for his assistance with some particularly curly integrals. Thomson & Winterbottom Expires December 7, 2008 [Page 31] Internet-Draft Uncertainty & Confidence June 2008 Appendix A. Conversion Between Cartesian and Geodetic Coordinates The process of conversion from geodetic (latitude, longitude and altitude) to earth-centered, earth-fixed (ECEF) Cartesian coordinates is relatively simple. In this section, the following constants and derived values are used from the definition of WGS84 [WGS84]: {radius of ellipsoid} R = 6378137 meters {inverse flattening} 1/f = 298.257223563 {first eccentricity squared} e^2 = f * (2 - f) {second eccentricity squared} e'^2 = e^2 * (1 - e^2) To convert geodetic coordinates (latitude, longitude, altitude) to ECEF coordinates (X, Y, Z), use the following relationships: N = R / sqrt(1 - e^2 * sin(latitude)^2) X = (N + altitude) * cos(latitude) * cos(longitude) Y = (N + altitude) * cos(latitude) * sin(longitude) Z = (N*(1 - e^2) + altitude) * sin(latitude) The reverse conversion requires more complex computation and most methods introduce some error in latitude and altitude. A range of techniques are described in [Convert]. A variant on the method originally proposed by Bowring, which results in an acceptably small error, is described by the following: p = sqrt(X^2 + Y^2) r = sqrt(X^2 + Y^2 + Z^2) u = atan((1-f) * Z * (1 + e'^2 * (1-f) * R / r) / p) latitude = atan((Z + e'^2 * (1-f) * R * sin(u)^3) / (p - e^2 * R * cos(u)^3)) longitude = atan(Y / X) altitude = sqrt((p - R * cos(u))^2 + (Z - (1-f) * R * sin(u))^2) If the point is near the poles, that is "p < 1", the value for Thomson & Winterbottom Expires December 7, 2008 [Page 32] Internet-Draft Uncertainty & Confidence June 2008 altitude that this method produces is unstable. A simpler method for determining the altitude of a point near the poles is: altitude = |Z| - R Thomson & Winterbottom Expires December 7, 2008 [Page 33] Internet-Draft Uncertainty & Confidence June 2008 Appendix B. Calculating the Upward Normal of a Polygon For a polygon that is guaranteed to be convex and coplanar, the upward normal can be found by finding the vector cross product of adjacent edges. For more general cases the Newell method of approximation described in [Sunday02] may be applied. In particular, this method can be used if the points are only approximately coplanar, and for non-convex polygons. This process requires a Cartesian coordinate system. Therefore, convert the geodetic coordinates of the polygon to Cartesian, ECEF coordinates (Appendix A). If no altitude is specified, assume an altitude of zero. This method can be condensed to the following set of equations: Nx = sum from i=1..n of (y[i] * (z[i+1] - z[i-1])) Ny = sum from i=1..n of (z[i] * (x[i+1] - x[i-1])) Nz = sum from i=1..n of (x[i] * (y[i+1] - y[i-1])) For these formulae, the polygon is made of points "(x[1], y[1], z[1])" through "(x[n], y[n], x[n])". Each array is treated as circular, that is, "x[0] == x[n]" and "x[n+1] == x[1]". To translate this into a unit-vector; divide each component by the length of the vector: Nx' = Nx / sqrt(Nx^2 + Ny^2 + Nz^2) Ny' = Ny / sqrt(Nx^2 + Ny^2 + Nz^2) Nz' = Nz / sqrt(Nx^2 + Ny^2 + Nz^2) Thomson & Winterbottom Expires December 7, 2008 [Page 34] Internet-Draft Uncertainty & Confidence June 2008 10. References 10.1. Normative References [RFC2119] Bradner, S., "Key words for use in RFCs to Indicate Requirement Levels", BCP 14, RFC 2119, March 1997. [I-D.ietf-geopriv-policy] Schulzrinne, H., Tschofenig, H., Morris, J., Cuellar, J., and J. Polk, "Geolocation Policy: A Document Format for Expressing Privacy Preferences for Location Information", draft-ietf-geopriv-policy-15 (work in progress), March 2008. [WGS84] US National Imagery and Mapping Agency, "Department of Defense (DoD) World Geodetic System 1984 (WGS 84), Third Edition", NIMA TR8350.2, January 2000. [GeoShape] Thomson, M. and C. Reed, "GML 3.1.1 PIDF-LO Shape Application Schema for use by the Internet Engineering Task Force (IETF)", Candidate OpenGIS Implementation Specification 06-142r1, Version: 1.0, April 2007. 10.2. Informative References [RFC3693] Cuellar, J., Morris, J., Mulligan, D., Peterson, J., and J. Polk, "Geopriv Requirements", RFC 3693, February 2004. [RFC3694] Danley, M., Mulligan, D., Morris, J., and J. Peterson, "Threat Analysis of the Geopriv Protocol", RFC 3694, February 2004. [RFC4119] Peterson, J., "A Presence-based GEOPRIV Location Object Format", RFC 4119, December 2005. [RFC3825] Polk, J., Schnizlein, J., and M. Linsner, "Dynamic Host Configuration Protocol Option for Coordinate-based Location Configuration Information", RFC 3825, July 2004. [RFC3688] Mealling, M., "The IETF XML Registry", BCP 81, RFC 3688, January 2004. [RFC5139] Thomson, M. and J. Winterbottom, "Revised Civic Location Format for Presence Information Data Format Location Object (PIDF-LO)", RFC 5139, February 2008. [I-D.ietf-ecrit-lost] Thomson & Winterbottom Expires December 7, 2008 [Page 35] Internet-Draft Uncertainty & Confidence June 2008 Hardie, T., Newton, A., Schulzrinne, H., and H. Tschofenig, "LoST: A Location-to-Service Translation Protocol", draft-ietf-ecrit-lost-10 (work in progress), May 2008. [I-D.ietf-geopriv-pdif-lo-profile] Winterbottom, J., Thomson, M., and H. Tschofenig, "GEOPRIV PIDF-LO Usage Clarification, Considerations and Recommendations", draft-ietf-geopriv-pdif-lo-profile-11 (work in progress), February 2008. [ISO.GUM] ISO/IEC, "Guide to the expression of uncertainty in measurement (GUM)", Guide 98:1995, 1995. [NIST.TN1297] Taylor, B. and C. Kuyatt, "Guidelines for Evaluating and Expressing the Uncertainty of NIST Measurement Results", Technical Note 1297, Sep 1994. [Convert] Burtch, R., "A Comparison of Methods Used in Rectangular to Geodetic Coordinate Transformations", April 2006. [Sunday02] Sunday, D., "Fast polygon area and Newell normal computation.", Journal of Graphics Tools JGT, 7(2):9- 13,2002, 2002, . Thomson & Winterbottom Expires December 7, 2008 [Page 36] Internet-Draft Uncertainty & Confidence June 2008 Authors' Addresses Martin Thomson Andrew PO Box U40 Wollongong University Campus, NSW 2500 AU Phone: +61 2 4221 2915 Email: martin.thomson@andrew.com URI: http://www.andrew.com/ James Winterbottom Andrew PO Box U40 Wollongong University Campus, NSW 2500 AU Phone: +61 2 4221 2938 Email: james.winterbottom@andrew.com URI: http://www.andrew.com/ Thomson & Winterbottom Expires December 7, 2008 [Page 37] Internet-Draft Uncertainty & Confidence June 2008 Full Copyright Statement Copyright (C) The IETF Trust (2008). This document is subject to the rights, licenses and restrictions contained in BCP 78, and except as set forth therein, the authors retain all their rights. This document and the information contained herein are provided on an "AS IS" basis and THE CONTRIBUTOR, THE ORGANIZATION HE/SHE REPRESENTS OR IS SPONSORED BY (IF ANY), THE INTERNET SOCIETY, THE IETF TRUST AND THE INTERNET ENGINEERING TASK FORCE DISCLAIM ALL WARRANTIES, EXPRESS OR IMPLIED, INCLUDING BUT NOT LIMITED TO ANY WARRANTY THAT THE USE OF THE INFORMATION HEREIN WILL NOT INFRINGE ANY RIGHTS OR ANY IMPLIED WARRANTIES OF MERCHANTABILITY OR FITNESS FOR A PARTICULAR PURPOSE. Intellectual Property The IETF takes no position regarding the validity or scope of any Intellectual Property Rights or other rights that might be claimed to pertain to the implementation or use of the technology described in this document or the extent to which any license under such rights might or might not be available; nor does it represent that it has made any independent effort to identify any such rights. Information on the procedures with respect to rights in RFC documents can be found in BCP 78 and BCP 79. Copies of IPR disclosures made to the IETF Secretariat and any assurances of licenses to be made available, or the result of an attempt made to obtain a general license or permission for the use of such proprietary rights by implementers or users of this specification can be obtained from the IETF on-line IPR repository at http://www.ietf.org/ipr. The IETF invites any interested party to bring to its attention any copyrights, patents or patent applications, or other proprietary rights that may cover technology that may be required to implement this standard. Please address the information to the IETF at ietf-ipr@ietf.org. Thomson & Winterbottom Expires December 7, 2008 [Page 38]