Projectivity of Banach and C*-algebras of continuous fields

Abstract

We give necessary and sufficient conditions for the left projectivity and biprojectivity of Banach algebras defined by locally trivial continuous fields of Banach algebras. We identify projective C*-algebras defined by locally trivial continuous fields U = \,(At)t ∈ ,\ such that each C*-algebra At has a strictly positive element. For a commutative C*-algebra contained in B(H), where H is a separable Hilbert space, we show that the condition of left projectivity of is equivalent to the existence of a strictly positive element in and so to the spectrum of being a Lindel of space.