Near-extremizers of Young's Inequality for Rd

Abstract

If a pair of functions nearly extremizes Young's convolution inequality for Rd, with all three exponents finite and strictly greater than 1, then each function is close in norm to a Gaussian. The proof relies on the Riesz-Sobolev rearrangement inequality and in particular, on an approximate inverse Riesz-Sobolev inequality established in a companion paper.