Stability results for some geometric inequalities and their functional versions ∗

The Blaschke Santaló inequality and the Lp affine isoperimetric inequalities are major inequalities in convex geometry and they have a wide range of applications. Functional versions of the Blaschke Santaló inequality have been established over the years through many contributions. More recently and ongoing, such functional versions have been established for the Lp affine isoperimetric inequalities as well. These functional versions involve notions from information theory, like entropy and divergence. We list stability versions for the geometric inequalities as well as for their functional counterparts. Both are known for the Blaschke Santaló inequality. Stability versions for the Lp affine isoperimetric inequalities in the case of convex bodies have only been known in all dimensions for p = 1 and for p > 1 only for convex bodies in the plane. Here, we prove almost optimal stability results for the Lp affine isoperimetric inequalities, for all p, for all convex bodies, for all dimensions. Moreover, we give stability versions for the corresponding functional versions of the Lp affine isoperimetric inequalities, namely the reverse log Sobolev inequality, the Lp affine isoperimetric inequalities for log concave functions and certain divergence inequalities.