Symmetric Formulas for Products of Permutations
Abstract
We study the formula complexity of the word problem WordSn,k : \0,1\kn2 \0,1\: given n-by-n permutation matrices M1,…,Mk, compute the (1,1)-entry of the matrix product M1·s Mk. An important feature of this function is that it is invariant under action of Snk-1 given by \[ (π1,…,πk-1)(M1,…,Mk) = (M1π1-1,π1M2π2-1,…,πk-2Mk-1πk-1-1,πk-1Mk). \] This symmetry is also exhibited in the smallest known unbounded fan-in \AND,OR,NOT\-formulas for WordSn,k, which have size nO( k). In this paper we prove a matching n( k) lower bound for Snk-1-invariant formulas computing WordSn,k. This result is motivated by the fact that a similar lower bound for unrestricted (non-invariant) formulas would separate complexity classes NC1 and Logspace. Our more general main theorem gives a nearly tight nd(k1/d-1) lower bound on the Gk-1-invariant depth-d \MAJ,AND,OR,NOT\-formula size of WordG,k for any finite simple group G whose minimum permutation representation has degree~n. We also give nearly tight lower bounds on the Gk-1-invariant depth-d \AND,OR,NOT\-formula size in the case where G is an abelian group.
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