Continuous Sensitivity and Reversibility

Abstract

Let n be a positive integer and f a differentiable function from a convex subset C of the Euclidean space Rn to a smooth manifold. We define an invariant of f via counting certain threshold functions associated to f. We call this invariant the continuous sensitivity of f and denote it by csC(f). This invariant is a real number between 0 and n and measures how sensitive f is to change in its input variables. For example, if f is a constant function then csC(f)=0. On the other extreme, if csC(f)=n then f is one-to-one on C. This last statement is important for reversibility problems. To say that a function is reversible one can write an explicit inverse of the function. However, this is not always easy. Even a multilinear function can have a complicated inverse function. Here we give tools to compute continuous sensitivity which makes it possible to answer reversibility problems without finding explicit inverse functions.