This is a preview of subscription content, log in via an institution to check access.
Access this chapter
Tax calculation will be finalised at checkout
Purchases are for personal use only
Preview
Unable to display preview. Download preview PDF.
References
Adams, D.R.; Meyers, N.G.: Thinness and Wiener criteria for nonlinear potentials. Indiana Univ. Math. J. 22, 169–197 (1972).
Agmon, S.: Maximum theorems for solutions of higher order elliptic equations. Bull. Amer. Math. Soc. 66, 77–80 (1960).
Agmon, S.; Douglis, A.; Nirenberg, L.: Estimates near the boundary for solutions of elliptic partial differential equations satisfying general boundary conditions I. Comm. Pure Appl. Math. 12, 623–727 (1959).
Albinus, G.: Estimates of Agmon-Miranda type for solutions of the Dirichlet problem for linear elliptic differential operators of order 2m in plane domains with corners. Preprint. Akademie der Wiss. der DDR, Inst. f. Math. Berlin 1981.
Anger, G.: Funktionalanalytische Betrachtungen bei Differential-gleichungen unter Verwendung von Methoden der Potentialtheorie I. Berlin: Akademie-Verlag 1967.
Babuška, I.: Stability of the domain with respect to the fundamental problems in the theory of partial differential equations, mainly in connection with the theory of elasticity I,II. (Russian). Czechoslovak Math. J. 11(86), 76–105, 165–203 (1961).
Beckert, H.: Eine bemerkenswerte Eigenschaft der Lösungen des Dirichletschen Problems bei linearen elliptischen Differentialgleichungen. Math. Ann. 139, 255–264 (1960).
Berezanskij, Ju. M.; Rojtberg, Ja.A.: Homeomorphism-theorems and Green functions for general elliptic boundary value problems. (Russian). Ukr. mat. J. 19, 3–32 (1967).
Fuglede, B.: Quasi topology and fine topology. Séminaire Brelot-Choquet-Deny, 10e année 1965–1966.
Fuglede, B.: Applications du thèoréme minimax à l’étude de diverses capacitès. C.R. Acad. Sci. Paris, Ser. A 266, 921–923 (1968).
González, L.A.; Wildenhain, G.: Representatión de soluciones de ecuaciones diferenciales lineales elipticas (Parte I). Revista Ciencias Matematicas, vol.VI, No. 1, 72–82 (1985).
Hamann, U.: Approximation durch Lösungen allgemeiner elliptischer Randwertprobleme bei Gleichungen beliebiger Ordnung. Dissertation Wilhelm-Pieck-Universität Rostock 1986.
Havin, V.P.; Mazja, V.G.: Nonlinear potential theory. (Russian). Usp. Mat. Nauk 27:6, 67–138 (1972).
Hedberg, L.I.: Spectral synthesis and stability in Sobolev spaces. In Euclidean harmonic analysis (Proc. Univ. of Maryland 1979), Lecture Notes in Math. 779, 73–103, Springer Verlag 1980.
Hedberg, L.I.: Spectral synthesis in Sobolev spaces, and uniqueness of solutions of the Dirichlet problem. Acta Math. 147, 237–264 (1981).
Hedberg, L.I.: Nonlinear potential theory and Sobolev spaces. Proc. Spring School Lytomysl 1986.
Hedberg, L.I.; Wolff, T.H.: Thin sets in nonlinear potential theory. Ann. Inst. Fourier, Grenoble 33,4, 161–187 (1983).
Helms, L.L.: Introduction to potential theory. New York-London-Sydney-Toronto: Wiley-Interscience Series in Pure and Appl. Math. 22, 1969.
Keldyš, M.V.: On the solubility and stability of the Dirichlet problem. Usp. Mat. Nauk 8, 171–231 (1941) (Russian). Amer. Math. Soc. Translations (2) 51, 1–73 (1966).
Kolsrud, T.: A uniqueness theorem for higher order elliptic partial differential equations. Dept. of Mathematics. Univ. of Stockholm, Report No. 9 (1981).
Meyers, N.G.: A theory of capacities for functions in Lebesgue classes. Math. Scand. 26, 255–292 (1970).
Nečas, J.: Les méthods directes en théorie des equations elliptiques. Prag: Academia-Verlag 1967.
Sändig, A.-M.: Das Maximum-Prinzip vom Miranda-Agmon-Typ für Lösungen der biharmonischen Gleichung in einem Rechteck. Math. Nachr. 96, 49–51 (1980).
Schulze, B.-W.; Wildenhain, G.: Methoden der Potentialtheorie für elliptische Differentialgleichungen beliebiger Ordnung. Berlin: Akademie-Verlag 1977, Basel-Stuttgart: Birkhäuser-Verlag 1977.
Wiener, N.: The Dirichlet Problem. J. Math. Physics 3, 127–146 (1924)
Wildenhain, G.: Potentialtheorie linearer elliptischer Differentialgleichungen beliebiger Ordnung. Berlin: Akademie-Verlag 1968.
Wildenhain, G.: Darstellung von Lösungen linearer elliptischer Differentialgleichungen. Berlin: Akademie-Verlag, Math. Forschung, Band 8, 1981.
Wildenhain, G.: Uniform approximation by solutions of general boundary value problems for elliptic equations of arbitrary order I,II. Z. Anal. Anw. 2(6), 511–521 (1983), Math. Nachr. 113, 225–235 (1983).
Wildenhain, G.: Das Dirichlet-Problem für lineare elliptische Differentialgleichungen höherer Ordnung. Jahrbuch Überblicke Mathematik, 137–162 (1983).
Mazja, V.G.; Nazarov, S.A.: Conical points can be irregular in the sense of Wiener for elliptic equations of fourth order. Mat. zametki 39, 24–28 (1986) (Russian).
Author information
Authors and Affiliations
Editor information
Rights and permissions
Copyright information
© 1988 Springer-Verlag
About this paper
Cite this paper
Wildenhain, G. (1988). Potential theory methods for higher order elliptic equations. In: Král, J., Lukeš, J., Netuka, I., Veselý, J. (eds) Potential Theory Surveys and Problems. Lecture Notes in Mathematics, vol 1344. Springer, Berlin, Heidelberg. https://doi.org/10.1007/BFb0103351
Download citation
DOI: https://doi.org/10.1007/BFb0103351
Published:
Publisher Name: Springer, Berlin, Heidelberg
Print ISBN: 978-3-540-50210-4
Online ISBN: 978-3-540-45952-1
eBook Packages: Springer Book Archive