Coppersmith–Winograd algorithm: Difference between revisions

In the group-theoretic approach outlined by Cohn, Umans, et. al., there exists a concrete way of proving estimates of the exponent <math>\omega</math> of matrix multiplication via a concept known as the simultaneous triple product property (STPP). To be more specific, the STPP describes the property of a finite group simultaneously "realizing" several independent matrix multiplications via a corresponding family of "index triples" of subsets of the group in such a way that the complexity (rank) of these several multiplications does not exceed the complexity (rank) of the algebra. This leads to general estimates for <math>\omega</math> in terms of the the size of the group, the number of STPP triples realized by the group, and the sizes of the indexcomponents of these triples. The best groups for achieving tight bounds for <math>\omega</math> in this way appear to be wreath products of Abelian with symmetric groups. For such wreath products, the choice of appropriate STPP triples in an Abelian group and permutations in a corresponding symmetric group might yield concrete estimates of <math>\omega</math> close to 2, as described by [[Sandeep Murthy]].