Absence of local unconditional structure in spaces of smooth functions on two-dimensional torus

Abstract

Consider a finite collection \T1, …, TJ\ of differential operators with constant coefficients on T2 and the space of smooth functions generated by this collection, namely, the space of functions f such that Tj f ∈ C(T2). We prove that under a certain natural condition this space is not isomorphic to a quotient of a C(S)-space and does not have a local unconditional structure. This fact generalizes the previously known result that such spaces are not isomorphic to a complemented subspace of C(S).