On continuous choice of retractions onto nonconvex subsets

Abstract

For a Banach space B and for a class of its bounded closed retracts, endowed with the Hausdorff metric, we prove that retractions on elements A ∈ can be chosen to depend continuously on A, whenever nonconvexity of each A ∈ is less than 12. The key geometric argument is that the set of all uniform retractions onto an -paraconvex set (in the spirit of E. Michael) is 1--paraconvex subset in the space of continuous mappings of B into itself. For a Hilbert space H the estimate 1- can be improved to (1+2)1-2 and the constant 12 can be reduced to the root of the equation + 2+a3=1.