Reverse order law $(ab)^\dagger=b^\dagger(a^\dagger abb^\dagger)^\dagger a^\dagger$ in rings with involution
Abstract
In this paper we study several equivalent conditions for
the reverse order law $(ab)^\dagger=b^\dagger(a^\dagger abb^\dagger)^\dagger a^\dagger$ in rings with
involution. We extend some well-known results to more general
settings.
the reverse order law $(ab)^\dagger=b^\dagger(a^\dagger abb^\dagger)^\dagger a^\dagger$ in rings with
involution. We extend some well-known results to more general
settings.
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