Key points are not available for this paper at this time.
Given a real‐analytic function f: R^n R and a critical point a R^n, the Łojasiewicz inequality asserts that there exists 12, 1) such that the function |f-f (a) |^\, f^-1 remains bounded around a. In this paper, we extend the above result to a wide class of nonsmooth functions (that possibly admit the value +), by establishing an analogous inequality in which the derivative f (x) can be replaced by any element x^ of the subdifferential f (x) of f. Like its smooth version, this result provides new insights into the convergence aspects of subgradient‐type dynamical systems. Provided that the function f is sufficiently regular (for instance, convex or lower‐C^2), the bounded trajectories of the corresponding subgradient dynamical system can be shown to be of finite length. Explicit estimates of the rate of convergence are also derived.
Bolte et al. (Mon,) studied this question.