Shotgun identification on groups

Abstract

We consider the problem of shotgun identification of patterns on groups, which extends previous work on shotgun identification of DNA sequences and labeled graphs. A shotgun identification problem on a group G is specified by two finite subsets C ⊂ G and K ⊂ G and a finite alphabet A. In such problems, there is a ``global" pattern w ∈ ACK, and one would like to be able to identify this pattern (up to translation) based only on observation of the ``local" K-shaped subpatterns of w, called reads, centered at the elements of C. We consider an asymptotic regime in which the size of w tends to infinity and the symbols of w are drawn in an i.i.d. fashion. Our first general result establishes sufficient conditions under which the random pattern w is identifiable from its reads with probability tending to one, and our second general result establishes sufficient conditions under which the random pattern w is non-identifiable with probability tending to one. Additionally, we illustrate our main results by applying them to several families of examples.