Trace reconstruction with varying deletion probabilities

Abstract

In the trace reconstruction problem an unknown string x=(x0,…,xn-1)∈\0,1,...,m-1\n is observed through the deletion channel, which deletes each xk with a certain probability, yielding a contracted string X. Earlier works have proved that if each xk is deleted with the same probability q∈[0,1), then (O(n1/3)) independent copies of the contracted string X suffice to reconstruct x with high probability. We extend this upper bound to the setting where the deletion probabilities vary, assuming certain regularity conditions. First we consider the case where xk is deleted with some known probability qk. Then we consider the case where each letter ζ∈ \0,1,...,m-1\ is associated with some possibly unknown deletion probability qζ.