Term Coding and Dispersion: A Perfect-vs-Rate Complexity Dichotomy for Information Flow

Abstract

We introduce a new framework term coding for extremal problems in discrete mathematics and information flow, where one chooses interpretations of function symbols so as to maximise the number of satisfying assignments of a finite system of term equations. We then focus on dispersion, the special case in which the system defines a term map I:kr and the objective is the size of its image. Writing n:=||, we show that the maximum dispersion is (nD) for an integer exponent D equal to the guessing number of an associated directed graph, and we give a polynomial-time algorithm to compute D. In contrast, deciding whether perfect dispersion ever occurs (i.e.\ whether n( t)=nr for some finite n 2) is undecidable once r 3, even though the corresponding asymptotic rate-threshold questions are polynomial-time decidable.