Small Banach bundles and modules

Abstract

We characterize those (continuously-normed) Banach bundles E X with compact Hausdorff base whose spaces (E) of global continuous sections are topologically finitely-generated over the function algebra C(X), answering a question of I. Gogi\'c's and extending analogous work for metrizable X. Conditions equivalent to topological finite generation include: (a) the requirement that E be locally trivial and of finite type along locally closed and relatively Fσ strata in a finite stratification of X; (b) the decomposability of arbitrary elements in p((E)), 1 p<∞ as sums of N products in p(C(X))· (E) for some fixed N; (c) the analogous decomposability requirement for maximal Banach-module tensor products FC(X)(E) or (d) equivalently, only for F=1(C(X)).

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