Diffeomorphisms with Banach space domains
Abstract
Our basic element is a C1 mapping f:X Y, with X,Y Banach spaces, and with derivative everywhere invertible. So f is a local diffeomorphism at every point. The aim of this paper is to find a sufficient condition for f to be injective, and so a global diffeomorphism X f(X), and a sufficient condition for f to be bijective and so a global diffeomorphism onto Y. This last condition is also necessary in the particular case X=Y=n. In these theorems the key role is played by nonnegative auxiliary scalar coercive functions.
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