Lower bounds for trace reconstruction

Abstract

In the trace reconstruction problem, an unknown bit string x∈\0,1 \n is sent through a deletion channel where each bit is deleted independently with some probability q∈(0,1), yielding a contracted string x. How many i.i.d.\ samples of x are needed to reconstruct x with high probability? We prove that there exist x, y ∈\0,1 \n such that at least c\, n5/4/ n traces are required to distinguish between x and y for some absolute constant c, improving the previous lower bound of c\,n. Furthermore, our result improves the previously known lower bound for reconstruction of random strings from c 2 n to c 9/4n/ n .