A Note on Slice Rank and Matchings in Groups
Abstract
A multiplicative 3-matching in a group G is a triple of sets \ai\, \bi\, \ci\ ⊂ G such that aibjck = 1 if and only if i=j=k. Here we record the fact that PSL(2,p) has no multiplicative 3-matching of size greater than O(p8/3), yet the slice rank of its group algebra's multiplication tensor is at least (p3) over any field. This gives a negative answer to a conjecture of Petrov.
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