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2015 | 13 | 1 |

Tytuł artykułu

Torsional rigidity on compact Riemannian manifolds with lower Ricci curvature bounds

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Abstrakty

EN
In this article we prove a reverse Hölder inequality for the fundamental eigenfunction of the Dirichlet problem on domains of a compact Riemannian manifold with lower Ricci curvature bounds. We also prove an isoperimetric inequality for the torsional ridigity of such domains

Wydawca

Czasopismo

Rocznik

Tom

13

Numer

1

Opis fizyczny

Daty

otrzymano
2015-04-13
zaakceptowano
2015-09-07
online
2015-09-25

Twórcy

  • College of Sciences, Taibah University, Kingdom of Saudi Arabia
  • University Tunis El Manar, FST, Mathematics Department, Tunisia
autor
  • University Tunis El Manar, FST, Mathematics Department, Tunisia

Bibliografia

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  • [2] Faber C., Beweiss, dass unter allen homogenen Membrane von gleicher Fläche und gleicher Spannung die kreisf ˝ ormige die tiefsten Grundton gibt. Sitzungsber.-Bayer. Akad. Wiss., Math.Phys.Munich., 1923, 169-172.
  • [3] Payne L.E., Rayner M.E., Some isoperimetric norm bounds for solutions of the Helmholtz equation, Z. Angew. Math. Phys., 1973, 24, 105-110.[Crossref]
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  • [5] Kohler Jobin M.T., Sur la première fonction propre d’une membrane: une extension à N dimensions de l’inégalité isopérimétrique de Payne-Rayner, Z. Angew. Math. Phys., 1977, 28, 1137-1140.[Crossref]
  • [6] Chiti G., A reverse Hölder inequality for the eigenfunctions of linear second order elliptic operators, Z. Angew. Math. Phys., 1982, 33, 143-148.
  • [7] Hasnaoui A., On the Problem of Queen Dido for a Wedge like membrane and a Compact Riemannian manifold with lower Ricci curvature bound, PhD thesis, University Tunis El Manar, Tunis, Tunisia. 2014.
  • [8] Cheng S.Y., Eigenvalue comparison theorems and its geometric aplications, Math. Z., 1975, 143, 289-297.
  • [9] Bérard P., Meyer D., Inégalités isopérimétriques et applications, Ann. Scient. Ec. Norm. Sup. 1982, 4, 15, 513-542.
  • [10] Gamara Abdelmoula N., Symétrisation d’inéquations elliptiques et applications géométriques, Math. Z. 1988, 199, 181-190.
  • [11] Ling J., Lu Z., Bounds of eigenvalues on Riemannian manifolds., Adv. Lect. Math. (ALM), 2010, 10, 241-264.
  • [12] De Saint-Venant B., Mémoire sur la torsion des prismes. Mémoir. pres. divers. savants, Acad. Sci., 1856, 14, 233-560.
  • [13] Pólya G., Torsional rigidity, principal frequency, electrostatic capacity, and symmetrization, Quart. of Appl. Maths., 1948, 6, 267-277.
  • [14] Makai E., A proof of Saint-Venant’s theorem on torsional rigidity, Acta Math. Acad. Sci. Hungar., 1966, 17, 419-422.[Crossref]
  • [15] Bandle C., Isoperimetric inequalities and applications, Monographs and Studies in Mathematics, 7, Pitman (Advanced Publishing Program), Boston, Mass.-London, 1980.
  • [16] Pólya G., Szeg˝o G., Isoperimetric Inequalities in Mathematical Physics. Princeton University Press, 1951.
  • [17] Carroll T., Ratzkin J.: Interpolating between torsional rigidity and principal frequency, J. Math. Anal. Appl., 2011, 379, 818-826.[WoS]
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  • [19] Van den Berg M., Estimates for the torsion function and Sobolev constants, Potential. Anal., 2012, 36, 607-616.[WoS]
  • [20] Carroll T., Ratzkin J., A reverse Hölder inequality for extremal Sobolev functions, Potential. Anal, DOI 10.1007/s11118-014-9433-6.[Crossref]
  • [21] Payne L.E., Some comments on the past fifty years of isoperimetric inequalities, Inequalities (Birmingham, 1987), Lecture Notes in Pure and Appl. Math., 1991, 129, 143-161.
  • [22] Payne L.E., Some isoperimetric inequalities in the torsion problem for multiply connected regions, Studies in mathematical analysis and related topics: Essays in honor of Georgia Pólya, Stanford Univ. Press, Stanford, Calif., 1962, 270-280.
  • [23] Payne L.E., Weinberger, H.F., Some isoperimetric inequalities for membrane frequencies and torsional rigidity, J. Math. Anal. Appl., 1961, 2, 210-216.[Crossref]
  • [24] Ashbaugh M.S., Benguria R. D., A sharp bound for the ratio of the first two Dirichlet eigenvalues of a domain in a hemisphere of Sn., Trans. Amer. Math. Soc., 2001, 353, 1055-1087.
  • [25] Chavel I., Feldman E. A., Isoperimetric inequalities on curved surfaces., Adv. in Math., 1980, 37, 83-98.
  • [26] Gromov M., Paul Levy’s isoperimetric inequality. Appendix C in Metric structures for Riemannian and non-Riemannian spaces., Progress in Mathematics, 152., Birkh˝auser Boston, Inc., Boston, MA, 1999.
  • [27] Benguria, R. D.: Isoperimetric inequalities for eigenvalues of the Laplacian. Entropy and the quantum II, 21-60, Contemp. Math., 552, Amer. Math. Soc., Providence, RI (2011).[Crossref]
  • [28] Chiti G., An isoperimetric inequality for the eigenfunctions of linear second order elliptic operators, Boll. Un. Mat. Ital. A., 1982, 6, 1, 145-151.
  • [29] Hardy G.H., Littlewood, J.E., Pólya G., Some simple inequalities satisfied by convex functions, Messenger Math., 1929, 58, 145-152. Reprinted in Collected Papers of G. H. Hardy, Vol.II, London Math. Soc., Clarendon Press: Oxford, 500-508, 1967.
  • [30] Talenti G., Elliptic equations and rearrangements, Ann. Scuola Norm. Sup. Pisa Cl. Sci., 1976, 3, 697-718.

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Bibliografia

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bwmeta1.element.doi-10_1515_math-2015-0053
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