Yunlong YANG , Nan JIANG , Deyan ZHANG . NOTES ON THE LOG-BRUNN-MINKOWSKI INEQUALITY^*[J]. Acta mathematica scientia, Series B, 2023 , 43(6) : 2333 -2346 . DOI: 10.1007/s10473-023-0601-x

[1] Böröczky K J, Henk M. Cone-volume measure of general centered convex bodies. Adv Math, 2016, 286: 703-721
[2] Böröczky K J, Lutwak E, Yang D, et al.The log-Brunn-Minkowski inequality. Adv Math, 2012, 231: 1974-1997
[3] Böröczky K J, Lutwak E, Yang D, et al. The logarithmic Minkowski problem. J Amer Math Soc, 2013, 26: 831-852
[4] Chen S B, Li Q R, Zhu G X. The logarithmic Minkowski problem for non-symmetric measures. Trans Amer Math Soc, 2019, 371: 2623-2641
[5] Colesanti A, Livshyts G V, Marsiglietti A. On the stability of Brunn-Minkowski type inequalities. J Funct Anal, 2017, 273: 1120-1139
[6] Colesanti A, Livshyts G V.A note on the quantitative local version of the log-Brunn-Minkowski inequality//Aron R, Gutierrez G, Martin M, et al. The Mathematical Legacy of Victor Lomonosov: Operator Theory. Berlin: De Gruyter, 2020: 85-98
[7] Eskenazis A, Moschidis G. The dimensional Brunn-Minkowski inequality in Gauss space. J Funct Anal, 2021, 280: 108914
[8] Firey W J. p-Means of convex bodies. Math Scand, 1962, 10: 17-24
[9] Gage M. Positive centers and the Bonnesen inequality. Proc Amer Math Soc, 1990, 110: 1041-1048
[10] Gage M, Li Y. Evolving plane curves by curvature in relative geometries II. Duke Math J, 1994, 75: 79-98
[11] Gardner R J. The Brunn-Minkowski inequality. Bull Amer Math Soc, 2002, 39: 355-405
[12] Gardner R J, Hug D, Weil W. Operations between sets in geometry. J Eur Math Soc, 2013, 15: 2297-2352
[13] Gruber P M.Convex and Discrete Geometry. Berlin: Springer, 2007
[14] Henk M, Linke E. Cone-volume measures of polytopes. Adv Math, 2014, 253: 50-62
[15] He B, Leng G, Li K. Projection problems for symmetric polytopes. Adv Math, 2006, 207: 73-90
[16] Henk M, Pollehn H. On the log-Minkowski inequality for simplices and parallelepipeds. Acta Math Hungar, 2018, 155: 141-157
[17] Henk M, Schürman A, Wills J M. Ehrhart polynomials and successive minima. Math, 2005, 52: 1-16
[18] Huang P L, Pan S L, Yang Y L. Positive center sets of convex curves. Discrete Comput Geom, 2015, 54: 728-740
[19] Ji L W, Yang Z H. The discrete Orlicz-Minkowski problem for p-capacity. Acta Math Sci, 2022, 42B(4): 1403-1413
[20] Jin H L. The log-Minkowski measure of asymmetry for convex bodies. Geom Dedicata, 2018, 196: 27-34
[21] Kaiser M J. The ε-positive center figure. Appl Math Lett, 1996, 9: 67-70
[22] Kolesnikov A V, Milman E. Local L^p-Brunn-Minkowski inequalities for p<1. Mem Amer Math Soc, 2022, 277(1360): 1-78
[23] Lutwak E. The Brunn-Minkowski-Firey theory. I. Mixed volumes and the Minkowski problem. J Differential Geom, 1993, 38: 131-150
[24] Lutwak E. The Brunn-Minkowski-Firey theory. II. Affine and geominimal surface areas. Adv Math, 1996, 118: 244-294
[25] Ma L. A new proof of the log-Brunn-Minkowski inequality. Geom Dedicata, 2015, 177: 75-82
[26] Pan S L, Yang Y L, Huang P L. The ε-positive center set and its applications. C R Acad Sci Paris Ser I, 2016, 354: 195-200
[27] Putterman E. Equivalence of the local and global versions of the L^p-Brunn-Minkowski inequality. J Funct Anal, 2021, 280: 108956
[28] Rotem L.A letter: The log-Brunn-Minkowski inequality for complex bodies. arXiv:1412.5321
[29] Roysdon M, Xing S. On L^p-Brunn-Minkowski type and L_p-isoperimetric type inequalities for measures. Trans Am Math Soc, 2021, 374: 5003-5036
[30] Saroglou C. Remarks on the conjectured log-Brunn-Minkowski inequality. Geom Dedicata, 2015, 177: 353-365
[31] Saroglou C. More on logarithmic sums of convex bodies. Mathematika, 2016, 62: 818-841
[32] Schneider R.Convex Bodies: The Brunn-Minkowski Theory. Second Expanded Edition. Encyclopedia of Mathematics and its Applications 151. Cambridge: Cambridge University Press, 2014
[33] Stancu A. The discrete planar L₀-Minkowski problem. Adv Math, 2002, 167: 160-174
[34] Stancu A. On the number of solutions to the discrete two dimensional L₀-Minkowski problem. Adv Math, 2003, 180: 290-323
[35] Stancu A. The logarithmic Minkowski inequality for non-symmetric convex bodies. Adv Appl Math, 2016, 73: 43-58
[36] Thompson A C. Minkowski Geometry.Cambridge: Cambridge University Press, 1996
[37] Xi D M, Leng G S. Dar's conjecture and the log-Brunn-Minkowski inequality. J Differential Geom, 2016, 103: 145-189
[38] Xiong G. Extremum problems for the cone volume functional for convex ploytopes. Adv Math, 2010, 225: 3214-3228
[39] Yang J, Ye D P, Zhu B C. On the L_p Brunn-Minkowski theory and the L_p Minkowski problem for C-coconvex sets. Int Math Res Not, 2023, 2023: 6252-6290
[40] Yang Y L. Nonsymmetric extension of the Green-Osher inequality. Geom Dedicata, 2019, 203: 155-161
[41] Yang Y L, Zhang D Y. The log-Brunn-Minkowski inequality in $\mathbb{R}^3$. Proc Amer Math Soc, 2019, 147: 4465-4475
[42] Zhu G X. The logarithmic Minkowski problem for polytopes. Adv Math, 2014, 262: 909-931