Composition of random functions and word reconstruction
Abstract
Given two functions a\!:\! [n] → [n] and b\!:\! [n] → [n] chosen uniformly at random, any word w=w1w2… wk∈ \a,b\k induces a random function w\!:\! [n] → [n] by composition, i.e. w=φwk … φw1 with φa=a and φb=b. We study the following question: assuming w is fixed but unknown, and n goes to infinity, does one sample of w carry enough information to (partially) recover the word w with good enough probability? We show that the length of w, and its exponent (largest d such that w=ud for some word u) can be recovered with high probability. We also prove that the random functions stemming from two different words are separated in total variation distance, provided that certain ``auto-correlation'' word-depending constant c(w) is different for each of them. We give an explicit expression for c(w) and conjecture that non-isomorphic words have different constants. We prove that this is the case assuming a major conjecture in transcendental number theory, Schanuel's conjecture.
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