Design of Orthogonal Golomb rulers with applications in wireless localization

Orthogonal Golomb rulers (GRs) are useful in a vast number of applications across various areas of engineering such as coding theory [1], radio astronomy and communications [2] and pulse phase modulation [3]. Yet, the design of sets with multiple mutually orthogonal GRs is a problem that finds no solution in current literature. In this paper we present a genetic algorithm to solve this long-standing problem. Our solution is based on a modification of a classic GR-generation algorithm [4], which allows the construction of GRs out of constrained sets of marks, such that multiple orthogonal rulers can be obtained iteratively. A complete pseudo-code of the new algorithm is offered, along with examples that not only demonstrate its ability to solve the intended problem but also indicate a gain in efficiency over [4] even when applied to generate optimal GRs. An application example in wireless localization is also given, in which a Cramér-Rao lower bounds (CRLBs) analysis of range-based target localization is used to illustrate the remarkable gains that can be achieved by employing orthogonal Golomb rulers to perform efficient multipoint ranging.

[1]  Abdollah Homaifar,et al.  Genetic Algorithm Approach to the Search for Golomb Rulers , 1995, ICGA.

[2]  F. Biraud,et al.  On optimum synthetic linear arrays with application to radioastronomy , 1974 .

[3]  A. Tanenbaum Computer recreations , 1973 .

[4]  Konstantinos Drakakis,et al.  A review of the available construction methods for Golomb rulers , 2009, Adv. Math. Commun..

[5]  Giuseppe Thadeu Freitas de Abreu,et al.  Analysis of wireless localization with Golomb-optimized multipoint ranging , 2014, 2014 11th International Symposium on Wireless Communications Systems (ISWCS).

[6]  Pascal Van Hentenryck,et al.  Local Search-based Hybrid Algorithms for Finding Golomb Rulers , 2007, Constraints.

[7]  G.S. Bloom,et al.  Applications of numbered undirected graphs , 1977, Proceedings of the IEEE.

[8]  Giuseppe Thadeu Freitas de Abreu,et al.  Optimized super-resolution ranging over ToA measurements , 2014, 2014 IEEE Wireless Communications and Networking Conference (WCNC).

[9]  Andrew B. Kahng,et al.  A new adaptive multi-start technique for combinatorial global optimizations , 1994, Oper. Res. Lett..

[10]  James B. Shearer,et al.  Some new optimum Golomb rulers , 1990, IEEE Trans. Inf. Theory.

[11]  Abderrazak Jemai,et al.  A hybrid genetic algorithm for Golomb ruler problem , 2010, ACS/IEEE International Conference on Computer Systems and Applications - AICCSA 2010.

[12]  William T. Rankin,et al.  Optimal Golomb Rulers: An Exhaustive Parallel Search Implementation , 1993 .