The involution width of finite simple groups


Abstract in English

For a finite group generated by involutions, the involution width is defined to be the minimal $kinmathbb{N}$ such that any group element can be written as a product of at most $k$ involutions. We show that the involution width of every non-abelian finite simple group is at most $4$. This result is sharp, as there are families with involution width precisely 4.

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