Intersection of subspaces in A2 for a three-dimensional division algebra A over a finite field

Abstract

Let A be a three-dimensional nonassociative division algebra over a finite field. Let A act on the space A2 by left multiplication. For a nonzero vector v in A2 we have a three-dimensional subspace Av in A2. This paper concerns about possible dimension of the intersection of Av and Av' for v, v' in A2. One of our results is that there exists a two-dimensional intersection if and only if A is isotopic to a commutative algebra. We use a classical theorem that A is a twisted field of Albert.

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