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Existence and regularity results for oblique derivative problems for heat equations in an angle

Published online by Cambridge University Press:  14 November 2011

M. G. Garroni ,
V. A. Solonnikov  and
M. A. Vivaldi
M. G. Garroni
Affiliation:
Dipartimento di Matematica, Università ‘La Sapienza’, Rome, Italy
V. A. Solonnikov
Affiliation:
St. Petersburg Branch, Steklov Mathematical Institute, Russian Academy of Sciences, Russia
M. A. Vivaldi
Affiliation:
Dipartimento MeMoMat, Università ‘La Sapienza’, Rome, Italy
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Extract

An initial-boundary-value problem is considered for the heat equation in an infinite angle dθrR2 × [0, ∞) with the oblique derivative boundary conditions on the faces λi of the angle:

with either h0 + h1 > 0, or h0 + h1 ≦ 0. The unique solvability of such a problem is proved in appropriate weighted Sobolev spaces according to the sign of h0 + h1. Estimates of the solution are obtained under ‘natural’ restrictions on the opening of the angle.

Type
Research Article
Information
Proceedings of the Royal Society of Edinburgh Section A: Mathematics , Volume 128 , Issue 1 , 1998 , pp. 47 - 79
Copyright
Copyright © Royal Society of Edinburgh 1998

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References

1Agranovich, M. S. and Vishik, M. I.. Elliptic problems with a parameter and parabolic problems of general type. Russian Math. Surveys 19 (1964), 53157.CrossRefGoogle Scholar
2Avantaggiati, A.. Problemi al contorno ellittici in aperti di ℝ″ con punti conici. Sem. Mat. Fis. Milano 47(1977), 943.Google Scholar
3Dauge, M.. Elliptic boundary value problems on corners domains, Lectures Notes in Mathematics 1341 (Berlin: Springer, 1988).CrossRefGoogle Scholar
4Frolova, E. V.. On a certain nonstationary problem in a dihedral angle, I. J. Soviet Math. 70 (1994), 1828–40.Google Scholar
5Garroni, M. G. and Menaldi, J. L.. Green's function and invariant density for an integro-differential operator of second order. Ann. Mat. Pura Appl. Ser. IV 154 (1989), 177222.Google Scholar
6Garroni, M. G. and Solonnikov, V. A.. On parabolic oblique derivative problem with Hölder continuous coefficients. Comm. Partial Differential Equations 9 (1984), 1323–72.CrossRefGoogle Scholar
7Garroni, M. G., Solonnikov, V. A. and Vivaldi, M. A.. On the oblique derivative problem in an infinite angle. Topol. Methods Nonlinear Anal. 7 (1996), 299325.Google Scholar
8Garroni, M. G., Solonnikov, V. A. and Vivaldi, M. A.. The Green function for the heat equation in a dihedral angle with oblique boundary conditions. Ann. Sc. Noz. Sup. Pisa (to appear).Google Scholar
9Grisvard, P.. Elliptic problems in nonsmooth domains (Boston: Pitman, 1985).Google Scholar
10Kondrat'sv, V. A.. Boundary-value problems for elliptic equations in domains with conical or angular point. Trans. Moscow Math. Soc. 1967 (1968), 227314.Google Scholar
11Kozlov, V. A.. On coefficients in the asymptotics of solutions of initial-boundary parabolic problems in domains with a conical point. Siberian Math. J. 29 (1988), 222–33.Google Scholar
12Ladyzěnskaja, O. A.. The mathematical theory of viscous incompressible flow, 2nd edn (New York: Gordon and Breach, 1969).Google Scholar
13Nazarov, S. A. and Plamenevskii, B. P.. Elliptic problems in domains with piecewise smooth boundaries. De Gruyter Exposition in Mathematics 13 (Berlin–New York: De Gruyter, 1991).Google Scholar
14Solonnikov, V. A.. Solvability of the classical initial-boundary-value problems for the heat-condition equation in a dihedral angle. J. Soviet Math. 32 (1986), 526–46.CrossRefGoogle Scholar
15Solonnikov, V. A. and Frolova, E. V.. On a problem with the third boundary condition for the Laplace equation in a plane angle and its applications to parabolic problems. Leningrad Math. J 2 (1991), 891916.Google Scholar
16Solonnikov, V. A. and Frolova, E. V.. The investigation of a problem for the Laplace equation with boundary condition of a special form in a plane angle. J. Soviet Math. 62 (1992), 2819–31.Google Scholar
17Solonnikov, V. A. and Frolova, E. V.. On a certain nonstationary problem in a dihedral angle II. J. Soviet Math. 70 (1994), 1841–6.Google Scholar
18Zaionchkowskii, V. and Solonnikov, V. A.. On the Neumann problem for second-order elliptic equations in domains with edges on the boundary. J. Soviet Math. 27 (1984), 2561–86.CrossRefGoogle Scholar