Location Estimation in Wireless Sensor Networks

1. 後卓越計畫進度 中央大學 許健平 教授 淡江大學 張志勇 教授 報告 張育嘉

2. Location Estimation for Wireless Sensor Networks • Location estimation algorithms can be categorized as • Range-based schemes • TOA, TDOA, AOA, RSSI • Range-free schemes • DV-based scheme • Convex Position Estimation (CPE)

3. Convex Position Estimation (CPE)

4. Distributed Location Estimation Algorithm • A few nodes have known position – equipped with GPS or placed deliberately (Beacon node) • The remainder nodes estimate position from knowledge about communication links • The beacon node has the ability of modifying the power level

5. O4 (x4,y4) P O2 (x2,y2) r O2 (x2,y2) O2 (x2,y2) O2 (x2,y2) O1 (x1,y1) O1 (x1,y1) O1 (x1,y1) Ｑ O3 (x3,y3) O1 (x1,y1) O3 (x3,y3) O3 (x3,y3) Distributed Location Estimation Algorithm

6. O4 (x4,y4) O4 (x4,y4) O2 (x2,y2) O2 (x2,y2) O1 (x1,y1) O3 (x3,y3) O1 (x1,y1) O3 (x3,y3) Reduce the Range of ER • If a normal node have farther neighbor beacon, the ER can be reduced to smaller one

7. Reduce the ER: Rule 1 • Rule 1: The cut point is based on the intersection point of circle and the borders of estimative rectangle

8. Reduce the ER: Rule 2 • Rule 2: The cut point is based on the midpoint of intersection arc

9. Reduce the Computation Complexity • We need to use some trigonometric functions, such as sin, cos, asin and acos to find the midpoint of an arc • A line segment is used to instead of the arc

10. How to Cut the ER? • We need to define complete rules to decide what border must be cut (b) (c) (a)

11. Slope of Line Segment • We can divide the slope range of a line segment into four regions as the figure show. tan 112.5° = -2.4142 tan 67.5° = 2.4142 tan 22.5° = 0.4142 tan -22.5° = -0.4142 tan -67.5° = -2.4142

12. Real networks environment