收稿日期: 2020-03-25
网络出版日期: 2022-01-06
基金资助
国家自然科学基金资助项目(11671249)
The properties of complex centroid body
Received date: 2020-03-25
Online published: 2022-01-06
金天, 冷岗松 . 复质心体的性质[J]. 上海大学学报(自然科学版), 2021 , 27(6) : 1144 -1148 . DOI: 10.12066/j.issn.1007-2861.2234
We define a complex centroid body and the support function. We prove the linearity of the complex centroid operator. For any two non-empty complex convex bodies, we prove the inclusion relationship of the Minkowski addition on the complex centroid body and extend it to convex bodies.
Key words: complex convex body; complex centroid body; linearity
| [1] | Shephard G C. Inequalities between mixed volumes of convex sets[J]. Mathematika, 1960, 7(2): 125-138. |
| [2] | Lutwak E, Yang D, Zhang G. $L_p$ affine isoperimetric inequalities[J]. Journal of Differential Geometry, 2000, 56:111-132. |
| [3] | Petty C M. Centroid surfaces[J]. Pacific Journal of Mathematics, 1961, 11(3): 1535-1547. |
| [4] | Li A J, Huang Q, Xi D. Volume inequalities for sections and projections of Wulff shapes and their polars[J]. Advances in Mathematics, 2017, 91:76-97. |
| [5] | Campi S, Gronchi P. The $L_p$-Busemann-Petty centroid inequality[J]. Advances in Mathematics, 2002, 167(1): 128-141. |
| [6] | Haberl C. Complex affine isoperimetric inequalities[J]. Calc Var Partial Differential Equations, 2019, 58(5): 200. |
| [7] | Lutwak E, Yang D, Zhang G. Orlicz centroid bodies[J]. Journal of Differential Geometry, 2010, 84:365-387. |
| [8] | Schneider R. Convex bodies: The Brunn-Minkowski theory [M]. Cambridge: Cambridge University Press, 2014. |
| [9] | Lutwak E, Yang D, Zhang G. Orlicz projection bodies[J]. Advances in Mathematics, 2010, 223(1): 220-242. |
| [10] | Haberl C, Schuster F E. General $L_p$ isoperimetric inequalities[J]. Journal of Differential Geometry, 2009, 83:1-26. |
| [11] | Fedotov V P. Geometric mean of convex sets[J]. Journal of Soviet Mathematics, 1978, 10(3): 488-491. |
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