On Local Convexity Of Nonlinear Mappings Between Banach Spaces

Abstract

We find conditions for a smooth nonlinear map f:U→ V between open subsets of Hilbert or Banach spaces to be locally convex in the sense that for some c and each positive <c the image % f(B(x)) of each -ball B(x)⊂ U is convex. We give a lower bound on c via the second order Lipschitz constant Lip2(f), the Lipschitz-open constant Lipo(f) of f, and the 2-convexity number conv2(X) of the Banach space % X.