On the complexity of solving equations over the symmetric group S4

Abstract

The complexity of solving equations over finite groups has been an active area of research over the last two decades, starting with Goldmann and Russell, The complexity of solving equations over finite groups from 1999. One important case of a group with unknown complexity is the symmetric group S4. In 2023, Idziak, Kawaek, and Krzaczkowski published ((2 n)) lower bounds for the satisfiability and equivalence problems over S4 under the Exponential Time Hypothesis. In the present note, we prove that the satisfiability problem PolSat(S4) can be reduced to the equivalence problem PolEqv(S4) and thus, the two problems have the same complexity. We provide several equivalent formulations of the problem. In particular, we prove that PolEqv(S4) is equivalent to the circuit equivalence problem for CC[2,3,2]-circuits, which were introduced by Idziak, Kaweek and Krzaczkowski. Under their strong exponential size hypothesis, such circuits cannot compute ANDn in size (o(n)). Our results provide an upper bound on the complexity of PolEqv(S4) that is based on the minimal size of ANDn over CC[2,3,2]-circuits.

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