Isoperimetric-inequalities in the parabolic obstacle problems

Díaz Díaz, Jesús Ildefonso; Mossino, J.

Isoperimetric-inequalities in the parabolic obstacle problems

dc.contributor.author	Díaz Díaz, Jesús Ildefonso
dc.contributor.author	Mossino, J.
dc.date.accessioned	2023-06-20T16:57:21Z
dc.date.available	2023-06-20T16:57:21Z
dc.date.issued	1992
dc.description.abstract	In this paper, we are concerned with the parabolic obstacle problem (u(t)=partial derivative u/partial derivative t [GRAPHICS] (A is a linear second order elliptic operator in divergence form or a nonlinear "pseudo-Laplacian"). We give an isoperimetric inequality for the concentration of u - psi around its maximum. Various consequences are given. In particular, it is proved that u - psi vanishes after a finite time, under a suitable assumption on psi(t) + A-psi + c- psi - f. Other applications are also given. These results are deduced from the study of the particular case psi=0. In this case, we prove that, among all linear second order elliptic operators A, having ellipticity constant 1, all equimeasurable domains OMEGA, all equimeasurable functions f and u0, the choice giving the "most concentrated" solution around its maximum is: A = -DELTA, OMEGA is a ball OMEGA, f and u0 are radially symmetric and decreasing along thc radii of OMEGA. A crucial point in our proof is a pointwise comparison result for an auxiliary one-dimensional unilateral problem. This is carried out by showing that this new problem is well-posed in L(infinity) in the sense of the accretive operators theory.
dc.description.department	Depto. de Análisis Matemático y Matemática Aplicada
dc.description.faculty	Fac. de Ciencias Matemáticas
dc.description.refereed	TRUE
dc.description.status	pub
dc.eprint.id	https://eprints.ucm.es/id/eprint/16260
dc.identifier.issn	0021-7824
dc.identifier.officialurl	http://cat.inist.fr/?aModele=afficheN&cpsidt=3798149
dc.identifier.uri	https://hdl.handle.net/20.500.14352/57507
dc.issue.number	3
dc.journal.title	Journal de Mathématiques Pures et Appliquées
dc.language.iso	eng
dc.page.final	266
dc.page.initial	233
dc.publisher	Elsevier
dc.rights.accessRights	restricted access
dc.subject.cdu	517.956.2
dc.subject.keyword	Stefan problem
dc.subject.keyword	rearrangement
dc.subject.keyword	parabolic obstacle problems
dc.subject.keyword	isoperimetric inequalities
dc.subject.keyword	comparison by rearrangement
dc.subject.keyword	accretive operators
dc.subject.keyword	extinction in finite time
dc.subject.ucm	Geometría diferencial
dc.subject.ucm	Ecuaciones diferenciales
dc.subject.unesco	1204.04 Geometría Diferencial
dc.subject.unesco	1202.07 Ecuaciones en Diferencias
dc.title	Isoperimetric-inequalities in the parabolic obstacle problems
dc.type	journal article
dc.volume.number	71
dcterms.references	A. ALVINO, P. L. LIONS, G. TROMBETTI,Comparaison des solutions d'équations paraboliques et elliptiques par symétrisation,une méthode nouvelle,C.R.Acad.Sci.Paris,303, Series 1,1986, pp. 975-978. C. BANDLE, Isoperimetric Inequalities and Applications, Pitman Advanced Publishing Program, Boston,London, Melbourne, 1980. C. BANDLE, J. MOSSINO, Rearrangement in Variational Inequalities, Annali di Mat.Pura et Applicata,(IV), CXXXVIlI, 1984, pp. 1-14; see also C.R.Acad.Sci.Paris,296, Series J, 1983, pp. 501-504. C. BANDLE, I. STAKGOLD, Isoperimetric Inequalities for the Effectiveness in Semilinear Parabolic Equations, I.S.N.M, 71, 1984, pp. 289-295. P. BENILAN, Équations d'évolution dans un espace de Banach quelconque et applications, Doctoral Thesis,Orsay, 1972. P. BENILAN, M. G. CRANDALL, A. PAZY, Nonlinear Evolution Equations Governed by Accretive Operators (to appear). P. BENILAN, P. ABORJAILY (to appear). A. BENSOUSSAN, J. L. LIONS, On the Support of the Solution of some Variational Inequalities of Evolution,J.Math.Soc. Japan,28, No. 1, 1976, pp. 1-17. H. BREZIS,Problemes unilatéraux,J.Math.Pures Appl.,51,1972, pp. 1-168. H. BREZIS, Opérateurs Maximaux Monotones et Semigroupes de Contraction dans les Espaces de Hi1bert,North-Holland, Amsterdam, 1973. H. BREZIS, Monotone Operators, Nonlinear Semigroups and Applications, Proc. Int Congress Math.,Vancouver, 1974. H. BREZIS, A. FRIEDMAN,Estimates on the Support of Solutions of Parabolic Variationa1 Inequalities III,J. Math.,20,1976, pp. 82-99. J. I. DÍAZ, Non1inear Partia1 Differentia1 Equations and Free Boundaries, I, Elliptic Equations, Pitman Advanced Publisiling Program, Boston, London, Melboume, 1985. J. I. DÍAZ, Anu1acion de soluciones para operadores acretivos en espacios de Banach, Rev. Real Acad.Cienc. Exact Fis. Natur. Madrid, 74, 1980, pp. 865-880. J. I. DÍAZ, J. MOSSINO, Inégalité isopérimétrique dans un probleme d'obstacle parabo1ique, C. R. Acad.Sci. Paris, 305, Series I, 1987, pp. 737-740. B. GUSTAFSSON, J. MOSSINO, Quelques inégalités isopérimétriques pour le prob1eme de Stefan,C.R.Acad.Sci. Paris,305,Series 1, 1987, pp. 669-672;see also Isoperimetric Inequalities for the Stefan Prob1em,S.IA.M. J. Math. Anal., 20, No. 5, 1989, pp. 1095-1108. G. S. LADDLE, V. LAKSHMIKANTHAM, A. S. VATSALA, Monotone Iterative Techniques for Non1inear Differential Equations, Monographs Appl. Math., 27, Pitman, 1985. O. A.LADYZHENSKAYA,N.N.URAL'TSEVA, Linear and Quasilinear Elliptic Equations, Academic Press,New York, 1968. C. MADERNA, S. SALSA, Some Specia1 Properties of Solutions to Obstacle Problems, Rendiconti del Seminario Matematico dell’Universita di Padova, 71, 1984, pp. 121-129. J, MOSSINO, Inéga1ités Isopérimétriques et App1ications en Physique, Hermann, Paris, 1984. J, MOSSINO, J. M. RAKOTOSON, Isoperimetric Inequalities in Parabolic Equations, Ann. Scuo. Norm. Sup.Pisa, Cl. Sci. IV, XIII, No. 1, 1986, pp. 51-73. J. MOSSINO, R. TEMAM, Directional Derivative of the Increasing Rearrangement Mapping, and Application to a Queer Differential Equation in Plasma Physics, Duke Math. J., 48, 1981, pp. 475-495. C. PICARD, Opérateurs  -accrétifs et génération de semi-groupes non linéaires, C. R. Acad. Sci. Paris,275, Series A, 1972, pp. 639-641. G. POLYA, C. SZEGO, Isoperimetric Inequalities in Mathematica1 Physics, Princeton University Press, 1951. K. SATO, On the Generators of non-Negative Contraction Semi-Groups in Banach Lattices, J. Math. Soc. Japan, 20, 1968, pp. 423-436. J. L. VÁZQUEZ, Symétrisation pour u,=Δ(u) et applications C. R. Acad. Sci. Paris, 295, Series 1, 1982,pp. 71-74; and 296, 1983, p. 455.
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