References
- Grachev , NV and Maz'ya , VG . 1986 . On the Fredholm radius for operators of the double layer potential type on piecewise smooth boundaries . Vest. Leningrad. Univ. , 19 ( 4 ) : 60 – 64 .
- Günter NM 1957 Die Potentialtheorie und ihre Anwendung auf Grundprobleme der mathematischen Physik, R. G. Teubner Verlagsgesellschaft Leipzig
- Hayman WK Kennedy PB 1976 Subharmonic Functions, Academic Press New York
- Helms LL 1969 Introduction to potential theory Pure and Applied Mathematics Vol 22 John Wiley and Sons New York
- Heuser H 1975 Funktionalanalysis, Teubner Stuttgart
- Kenig CE 1994 Harmonic Analysis Techniques for Second Order Elliptic Boundary Value Problems, American Mathematical Society Providence, Rhode Island
- Král J 1980 Integral Operators in Potential Theory Lecture Notes in Mathematics 823 Springer-Verlag Berlin
- Král , J . 1966 . The Fredholm method in potential theory . Trans. Amer. Math. Soc. , 125 : 511 – 547 .
- Král , J and Netuka , I . 1977 . Contractivity of C. Neumann's operator in potential theory . J. Math. Anal. Appl. , 61 : 607 – 619 .
- Krutitskii , PA . 2000 . The jump problem for the Helmholtz equation and singularities at the edges . Appl. Math. Letters , 13 : 71 – 76 .
- Krutitskii , PA . 2001 . The jump problem for the Laplace equation . Appl. Math. Letters , 14 : 353 – 358 .
- Krutitskii , PA . 2001 . Explicit solution of the jump problem for the Laplace equation and singularities at the edges . Mathematical Problems in Engineering , 7 : 1 – 13 .
- Krutitskii PA 2001 The Jump Problem for the Gravity – Inertial Wave Equation Raport de recherche, n. 2001-5, 13pp., Universite Technologie de Compiegne (France), Division Mathematiques Appliquees
- Landkof NL 1966 Fundamentals of Modern Potential Theory, Izdat. Nauka Moscow Russian
- Maz'ya VG 1991 Boundary integral equations Analysis IV. Encyclopaedia of Mathematical Sciences 27 pp. 127–222 Springer-Verlag New York
- Medková , D . 1997 . The third boundary value problem in potential theory for domains with a piecewise smooth boundary . Czech. Math. J. , 47 : 651 – 679 .
- Medková , D . 1998 . Solution of the Robin problem for the Laplace equation . Appl. of Math. , 43 : 133 – 155 .
- Medková , D . 1999 . Solution of the Dirichlet problem for the Laplace equation . Appl. of Math. , 44 : 143 – 168 .
- Medková , D . 1998 . Solution of the Neumann problem for the Laplace equation . Czechoslov. Math. J. , 48 : 768 – 784 .
- Miranda C 1970 Differential Equations of Elliptic Type, Springer-Verlag Berlin
- Netuka , I . 1972 . An operator connected with the third boundary value problem in potential theory . Czech. Math. J. , 22 ( 97 ) : 462 – 489 .
- Rathsfeld , A . 1992 . The invertibility of the double layer potential in the space of continuous functions defined on a polyhedron . The Panel Method. Applicable Analysis , 45 ( 1–4 ) : 135 – 177 .
- Rathsfeld , A . 1995 . The invertibility of the double layer potential operator in the space of continuous functions defined over a polyhedron . The Panel Method. Erratum. Applicable Analysis , 56 : 109 – 115 .
- Schechter M 1973 Principles of Functional Analysis, Academic Press New York
- Verchota , G . 1984 . Layer potentials and regularity for the Dirichlet problem for Laplace's equation in Lipschitz domains . Journal of Functional Analysis , 59 : 572 – 611 .
- Ziemer WP 1989 Weakly Differentiable Functions, Springer-Verlag New York