Effective quasianalytic Remez inequalities on tame sets

Abstract

We establish a Remez inequality for functions in quasianalytic Denjoy-Carleman classes CM on a large family of fat compact sets K ⊂eq Rn with tame geometry, including all fat compact sets definable in the o-minimal expansion of R by restricted CM functions. The inequality generalizes the classical Remez inequality for polynomials and its quasianalytic versions on convex bodies, replacing the polynomial degree by the Bang degree, an integer associated with the weight M and the size of the function. The constants depend explicitly on the Bang degree and the geometry of K. We derive a range of quantitative consequences: estimates for the volume of sublevel sets, comparison of Lp-norms, effective inequalities of Lojasiewicz, Harnack, and Markov type with explicit constants, and decay estimates for oscillatory integrals.