English

Discrete radar ambiguity problems

Classical Analysis and ODEs 2007-07-11 v1

Abstract

In this paper, we pursue the study of the radar ambiguity problem started in \cite{Ja,GJP}. More precisely, for a given function uu we ask for all functions vv (called \emph{ambiguity partners}) such that the ambiguity functions of uu and vv have same modulus. In some cases, vv may be given by some elementary transformation of uu and is then called a \emph{trivial partner} of uu otherwise we call it a \emph{strange partner}. Our focus here is on two discrete versions of the problem. For the first one, we restrict the problem to functions uu of the Hermite class, u=P(x)ex2/2u=P(x)e^{-x^2/2}, thus reducing it to an algebraic problem on polynomials. Up to some mild restriction satisfied by quasi-all and almost-all polynomials, we show that such a function has only trivial partners. The second discretization, restricting the problem to pulse type signals, reduces to a combinatorial problem on matrices of a special form. We then exploit this to obtain new examples of functions that have only trivial partners. In particular, we show that most pulse type signals have only trivial partners. Finally, we clarify the notion of \emph{trivial partner}, showing that most previous counterexamples are still trivial in some restricted sense.

Cite

@article{arxiv.math/0509031,
  title  = {Discrete radar ambiguity problems},
  author = {Aline Bonami and Gustavo Garrigos and Philippe Jaming},
  journal= {arXiv preprint arXiv:math/0509031},
  year   = {2007}
}