The authors prove a quantitative stability result for the Brunn-Minkowski inequality on sets of equal volume: If |A| = |B| > 0 and |A + B|^(1/n) =(2 + δ)|A|^(1/n) for some small δ, then, up to a translation, bot...The authors prove a quantitative stability result for the Brunn-Minkowski inequality on sets of equal volume: If |A| = |B| > 0 and |A + B|^(1/n) =(2 + δ)|A|^(1/n) for some small δ, then, up to a translation, both A and B are close(in terms of δ) to a convex set K.Although this result was already proved by the authors in a previous paper, the present paper provides a more elementary proof that the authors believe has its own interest. Also,the result here provides a stronger estimate for the stability exponent than the previous result of the authors.展开更多
基金supported by NSF Grant DMS-1262411,NSF Grant DMS-1361122,NSF Grant DMS-1069225 and DMS-1500771
文摘The authors prove a quantitative stability result for the Brunn-Minkowski inequality on sets of equal volume: If |A| = |B| > 0 and |A + B|^(1/n) =(2 + δ)|A|^(1/n) for some small δ, then, up to a translation, both A and B are close(in terms of δ) to a convex set K.Although this result was already proved by the authors in a previous paper, the present paper provides a more elementary proof that the authors believe has its own interest. Also,the result here provides a stronger estimate for the stability exponent than the previous result of the authors.
