熊革 - 同济大学 - 数学科学学院

个人简介

工作经历 2003. 07 --- 2015. 03 Department of Mathematics, Shanghai University ; Associate Professor (2007/03), Professor (2012/03), Ph. D. Supervisor (2013/05) Since 2015. 04 Professor, Department of mathematics, Tongji University 2007--- 2018 Visiting Research Associate, The University of Hongkong 2008. 09 --- 2009. 09 Visiting scholar, New York Universty, USA 2013/06/20---2013/07/10 Visiting scholar, Chern Institute of Mathematics, Nankai University 2014/07/01---2014/07/16 Visiting scholar, Chern Institute of Mathematics, Nankai University 2017/07/23---2017/08/05 Visiting scholar, Chern Institute of Mathematics, Nankai University

研究领域

凸体几何,几何分析 Convex Geometry, Geometric Analysis

近期论文

查看导师最新文章（温馨提示：请注意重名现象，建议点开原文通过作者单位确认）

Sharp affine isoperimetric inequalities for the volume decomposition functionals of polytopes，Advances in Mathematics,389 (2021), 107902. On the continuity of the solutions to the Lp capacitary Minkowski problem,Proceedings of the AMS, 149 (2021), 3063–3076. Steiner symmetrization (n -1) times is sufficient to transform an ellipsoid to a ball in R^n, Annales mathématiques du Québec, 45 (2021), 221–228. The Lp Minkowski problem for the electrostatic capacity ,Journal of Differential Geometry, 116 (2020), 555-596. The Lp Minkowski problem for the electrostatic /mathfrak{p}-capacity for/mathfrak{p} > n, Indiana Univ. Math. J., (2020), accepted. The Orlicz Brunn-Minkowski inequality for the projection body, Journal of Geometric Analysis, 30 (2020), 2253-2272. Sharp affine isoperimetric inequalities for the Minkowski first mixed volume, Bulletin of the London Mathematical Society,52 (2020), 161-174. Affine isoperimetric inequalities for intersection mean ellipsoids, Calculus of Variations and PDEs, (2019), 58: 191. A new approach to the Minkowski first mixed volume and the LYZ conjecture, Discrete Comput. Geom., 66 (2021), 122–139. The Lp capacitary Minkowski problem for polytopes，Journal of Functional Analysis, 277 (2019), 3131-3155. A new affine invariant geometric functional for polytopes and its associated affine isoperimetric inequalities, International Mathematics Research Notices, (2021), no. 12, 8977–8995. New affine inequalities and projection mean ellipsoids, Calculus of Variations and PDEs, (2019), 58: 44, 18 pp. Extremal problems for Lp surface areas and John ellipsoids,Journal of Mathematical Analysis and Applications, 479 (2019), 1226-1243. On mixed Lp John ellipsoids, Advances in Geometry, 19 (2019),297-312. The logarithmic John ellipsoid, Geometriae Dedicata, 197 (2018), 33–48. Convex bodies with identical John and LYZ ellipsoids, International Mathematics Research Notices, 2018 (2018), 470-491. A unified treatment for Lp Brunn-Minkowski type inequalities, Communications in Analysis and Geometry, 26 (2018), 435-460. Orlicz-Legendre ellipsoids, Journal of Geometric Analysis, 26 (2016) , 2474-2502. Orlicz-John ellipsoids, Advances in Mathematics, 265 (2014), 132-168. Extremum problems for the cone volume functional of convex polytopes, Advances in Mathematics, 225 (2010), 3214-3228. The minimal Orlicz surface area, Advances in Applied Mathematics, 61 (2014), 25-45. Bounds for inclusion measures of convex bodies, Advances in Applied Mathematics, 41 (2008), 584--598. Orlicz mixed quermassintegrals, Science China Mathematics, 57 (2014), 2549-2562. Chord power integrals and radial mean bodies, J. Math. Anal. Appl., 342 (2008), 629-637. Orlicz mixed affine quermassintegrals, Science China Mathematics, 58 (2015), 1715-1722. Inequalities for chord power integrals, J. Korean Math. Soc., 45 (2008), 587-596. Reconstructing triangles inscribed in convex bodies from X-ray functions, Acta Math. Sci. Ser. B, 24 (2004), 608-612.