Linear maps preserving product of involutions

Abstract

An element of the algebra Mn(F) of n × n matrices over a field F is called an involution if its square equals the identity matrix. Gustafson, Halmos, and Radjavi proved that any product of involutions in Mn(F) can be expressed as a product of at most four involutions. In this article, we investigate the bijective linear preservers of the sets of products of two, three, or four involutions in Mn(F).

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