Coded trace reconstruction in a constant number of traces

Abstract

The coded trace reconstruction problem asks to construct a code C⊂ \0,1\n such that any x∈ C is recoverable from independent outputs ("traces") of x from a binary deletion channel (BDC). We present binary codes of rate 1- that are efficiently recoverable from (Oq(1/3(1))) (a constant independent of n) traces of a BDCq for any constant deletion probability q∈(0,1). We also show that, for rate 1- binary codes, (5/2(1/)) traces are required. The results follow from a pair of black-box reductions that show that average-case trace reconstruction is essentially equivalent to coded trace reconstruction. We also show that there exist codes of rate 1- over an O(1)-sized alphabet that are recoverable from O((1/)) traces, and that this is tight.