Uniqueness of algebra norm on quotients of the algebra of bounded operators on a Banach space

Abstract

We show that for each of the following Banach spaces~X, the quotient algebra B(X)/I has a unique algebra norm for every closed ideal I of B(X) - X= (n∈2n)c0 and its dual, X= (n∈2n)_1, - X= (n∈2n)c0 c0() and its dual, X= (n∈2n)_11(), for an uncountable cardinal number~, - X = C0(KA), the Banach space of continuous functions vanishing at infinity on the locally compact Mr\'owka space~KA induced by an uncountable, almost disjoint family~A of infinite subsets of~N, constructed such that C0(KA) admits "few operators". Equivalently, this result states that every homomorphism from~B(X) into a Banach algebra is continuous and has closed range. The key step in our proof is to show that the identity operator on a suitably chosen Banach space factors through every operator in B(X)I with control over the norms of the operators used in the factorization. These quantitative factorization results may be of independent interest.