Operator Algebras of Bourgain Delbaen Spaces: Realization, Rigidity, and Ideal Structure

Abstract

This manuscript presents a systematic study of Calkin algebras -- the quotients L(X)/K(X) of bounded operators modulo compact operators on a Banach space X -- and establishes a framework for realizing commutative C*-algebras as such quotients while preserving geometric and topological information. Building on Motakis's reflexive version of the Bourgain--Delbaen construction, we prove that for every compact metric space K, there exists a reflexive Banach space XC(K) whose Calkin algebra is isomorphic to C(K) as a Banach algebra. Our contributions advance this result in several directions: we establish stability under finite products, enabling the realization of finite direct sums of C(K) spaces and matrix algebras Mm(C(K)) as Calkin algebras; we prove a localization principle showing compact operators on XC(K) can be approximated by finite-rank operators whose support respects the metric structure of K; we demonstrate that the diagonal function T K of any bounded operator T is H\"older continuous with optimal exponent 1/2, revealing a deep analytic constraint; we prove a rigidity theorem showing the Banach algebra structure of L(XC(K)) completely determines the topology of K, extending the classical Banach--Stone theorem; we classify all closed two-sided ideals and prime ideals in L(XC(K)) in terms of open subsets and points of K; and we resolve longstanding problems, notably by constructing the first reflexive Banach spaces with infinite-dimensional reflexive Calkin algebras. These results forge a deep connection between Banach space geometry, operator algebras, and topological invariants, revealing how Calkin algebras can be precisely engineered through the geometry of their underlying spaces.