IMPROVED GAGLIARDO-NIRENBERG INEQUALITIES ON HEISENBERG TYPE GROUPS 被引量：1

IMPROVED GAGLIARDO-NIRENBERG INEQUALITIES ON HEISENBERG TYPE GROUPS

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摘要 Motivated by the idea of M. Ledoux who brings out the connection between Sobolev embeddings and heat kernel bounds, we prove an analogous result for Kohn’s sub-Laplacian on the Heisenberg type groups. The main result includes features of an inequality of either Sobolev or Galiardo-Nirenberg type. Motivated by the idea of M. Ledoux who brings out the connection between Sobolev embeddings and heat kernel bounds, we prove an analogous result for Kohn’s sub-Laplacian on the Heisenberg type groups. The main result includes features of an inequality of either Sobolev or Galiardo-Nirenberg type.

作者罗光洲

机构地区 School of Mathematics and Statistics

出处《Acta Mathematica Scientia》 SCIE CSCD 2011年第4期1583-1590,共8页 数学物理学报（B辑英文版）

基金 supported by National Science Foundation of China (10771175)

关键词 Heisenberg type group heat kernel Sobolev inequality Galiardo-Nirenberg inequality Heisenberg type group heat kernel Sobolev inequality Galiardo-Nirenberg inequality

分类号 O152 [理学—基础数学]

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1肖玲,李海梁.COMPRESSIBLE NAVIER-STOKES-POISSON EQUATIONS[J].Acta Mathematica Scientia,2010,30(6):1937-1948. 被引量：3
2Aobing Li,Yan Yan Li.A HARNACK TYPE INEQUALITY FOR SOME CONFORMALLY INVARIANT EQUATIONS ON HALF EUCLIDEAN SPACE[J].Acta Mathematica Scientia,2009,29(4):1105-1112. 被引量：1

二级参考文献12

1Caffarelli L, Nirenberg L, Spruck J. The Dirichlet problem for nonlinear second-order elliptic equations, Ⅲ: Functions of the eigenvalues of the Hessian. Acta Math, 1985, 155:261-301.
2Guan P, Wang G. Local estimates for a class of fully nonlinear equations arising from conformal geometry. Int Math Res Not, 2003, (26): 1413-1432.
3Li A, Li Y Y. On some conformally invariant fully nonlinear equations. Comm Pure Appl Math, 2003, 56: 1416-1464.
4Li A, Li Y Y. Private notes, 2003.
5Li A, Li Y Y. On some conformally invariant fully nonlinear equations, Part Ⅱ: Liouville, Harnack and Yamabe. arXiv: math.AP/0403442 v1 25 Mar 2004.
6Li A, Li Y Y. On some conformally invariant fully nonlinear equations, Part Ⅱ: Liouville, Harnack and Yamabe. Aeta Math, 2005, 195:117-154.
7Li A, Li Y Y. A fully nonlinear version of the Yamabe problem on manifolds with boundary. J Eur Math Soc, 2006, 8:295-316.
8Li Y Y. Local gradient estimates of solutions to some conformally invariant fully nonlinear equations. arXiv: math.AP/0605559; to appear in Comm Pure Appl Math.
9Li Y Y, Zhang L. Liouville type theorems and Harnack type inequalities for semilinear elliptic equations. Journal d'Analyse Mathematique, 2003, 90:27-87.
10Schoen R. Courses at Stanford University, 1988, and New York University, 1989.

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1LIU XIQIANG.EXACT SOLUTIONS OF THE VARIABLE COEFFICIENT KdV AND SG TYPE EQUATIONS[J].Applied Mathematics(A Journal of Chinese Universities),1998,13(1):25-30. 被引量：25
2孙道椿,高宗升.ON THE C.CHANG TYPE INEQUALITY OF ALGEBROID FUNCTIONS[J].Acta Mathematica Scientia,2011,31(3):835-842. 被引量：2
3Yuan Zixia,Niu Pengcheng.SOME LIOUVILLE TYPE THEOREMS FOR THE P-SUB-LAPLACIAN ON THE GROUP OF HEISENBERG TYPE[J].Journal of Partial Differential Equations,2008,21(3):193-207.
4Zongfu Zhou,Li Zeng,Baorui Jia,Jianzhong Xu.PERIODIC SOLUTIONS TO DUFFING TYPE p-LAPLACIAN EQUATION WITH SEVERAL p-LAPLACIAN OPERATORS[J].Annals of Differential Equations,2013,29(1):121-126. 被引量：1
5刘建忠,甘文珍.华罗庚-王中烈型不等式的矩阵形式及推广(英文)[J].Journal of Mathematical Research and Exposition,2008(4):951-956.
6Kang Lishan,He Wei.An Improved GA for Combinational Logic Expressions[J].Wuhan University Journal of Natural Sciences,1998,3(1):17-20.
7Han Junqiang.DEGENERATE EVOLUTION INEQUALITIES ON GROUPS OF HEISENBERG TYPE[J].Journal of Partial Differential Equations,2005,18(4):341-354.
8HuangWenhua,ShenZuhe.ON A TWO-POINT BOUNDARY VALUE PROBLEM OF DUFFING TYPE EQUATION WITH DIRICHLET CONDITIONS[J].Applied Mathematics(A Journal of Chinese Universities),1999,14(2):131-136. 被引量：2
9Chusit Pradabpet,Sorawat Chivapreecha,Douangsamone Phetsomphou,Yoshikazu Miyanaga.An Improved GA in Hybrid of PTS-CAPPR Methods for PAPR Reduction in OFDM Systems[J].通讯和计算机（中英文版）,2010,7(12):63-68.
10Han Junqiang Niu Pengcheng.A CARLEMAN ESTIMATE ON GROUPS OF HEISENBERG TYPE[J].Journal of Partial Differential Equations,2006,19(4):341-358.

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