A Class of algebras admitting infinitely many norm topologies
Abstract
Let A be an algebra, and let A2 = span\ab : a, b ∈ A\ be a subalgebra of A. In this paper, we prove that if A2 has infinite codimension in A iff A has discontinuous square annihilation property (DSAP). In fact, in this case, the algebra A admits infinitely many non-equivalent algebra norms.
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