Geodesic
Fredholm radius of a potential theoretic operator for convex sets
Časopis pro pěstování matematiky, Tome 100 (1975) no. 4, pp. 374-383

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DOI : 10.21136/CPM.1975.117891
Classification : 31B20 
Netuka, Ivan. Fredholm radius of a potential theoretic operator for convex sets. Časopis pro pěstování matematiky, Tome 100 (1975) no. 4, pp. 374-383. doi: 10.21136/CPM.1975.117891
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[1] Ju. D. Burago, V. G. Mazja: Some problems in potential theory and function theory for regions with irregular boundaries. (Russian), Zapiski nauč. sem. Leningradskogo otd. MIAN 3 (1967).

[2] J. Král: The Fredholm radius of an operator in potential theory. Czechoslovak Math. J. 90 (15) (1965), 454-473, 565-588. | MR

[3] J. Král: The Fredholm method in potential theory. Trans. Amer. Math. Soc. 125 (1966), 511-547. | MR

[4] /. Král: Flows of heat and the Fourier problem. Czechoslovak Math. J. 20 (95) (1970), 556-598. | MR

[5] J. Král I. Netuka, J. Veselý: Potential theory II. (Czech), Lecture Note SPN, Praha, 1972.

[6] /. Mařík: The surface integral. Czechoslovak. Math. J. 6 (81) (1956), 522-558. | MR

[7] I. Netuka: Generalized Robin problem in potential theory. Czechoslovak Math. J. 22 (97) (1972), 312-324. | MR | Zbl

[8] I. Netuka: An operator connected with the third boundary value problem in potential theory. Czechoslovak Math. J. 22 (97) (1972), 462-489. | MR | Zbl

[9] I. Netuka: Double layer potentials and the Dirichlet problem. Czechoslovak Math. J. 24 (99) (1974), 59-73. | MR | Zbl

[10] J. Radon: Über die Randwertaufgaben beim logaritmischen Potential. Sitzungsber. Akad. Wiss. Wien (2a) I28 (1919), 1123-1167.

[11] F. Riesz, B. Sz. Nagy: Leçons d'analyse fonctionnelle. Akadémiai Kiadó, Budapest, 1952. | Zbl

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