Inner Rank and Lower Bounds for Matrix Multiplication
Abstract
We develop a notion of inner rank as a tool for obtaining lower bounds on the rank of matrix multiplication tensors. We use it to give a short proof that the border rank (and therefore rank) of the tensor associated with n× n matrix multiplication over an arbitrary field is at least 2n2-n+1. While inner rank does not provide improvements to currently known lower bounds, we argue that this notion merits further study.
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