On the isoperimetric constant, covariance inequalities and Lp-Poincar\'e inequalities in dimension one

Abstract

Firstly, we derive in dimension one a new covariance inequality of L1-L∞ type that characterizes the isoperimetric constant as the best constant achieving the inequality. Secondly, we generalize our result to Lp-Lq bounds for the covariance. Consequently, we recover Cheeger's inequality without using the co-area formula. We also prove a generalized weighted Hardy type inequality that is needed to derive our covariance inequalities and that is of independent interest. Finally, we explore some consequences of our covariance inequalities for Lp-Poincar\'e inequalities and moment bounds. In particular, we obtain optimal constants in general Lp-Poincar\'e inequalities for measures with finite isoperimetric constant, thus generalizing in dimension one Cheeger's inequality, which is a Lp-Poincar\'e inequality for p=2, to any real p≥ 1.