Sharp quantitative stability of the planar Brunn-Minkowski inequality

Abstract

We prove a sharp stability result for the Brunn-Minkowski inequality for A,B⊂R2. Assuming that the Brunn-Minkowski deficit δ=|A+B|12/(|A|12+|B|12)-1 is sufficiently small in terms of t=|A|12/(|A|12+|B|12), there exist homothetic convex sets KA ⊃ A and KB⊃ B such that |KA A||A|+|KB B||B| C t-12δ12. The key ingredient is to show for every ε>0, if δ is sufficiently small then |co(A+B) (A+B)| (1+ε)(|co(A) A|+|co(B) B|).