Literature Cited
B. V. Kvyadaras, “Solutions of a strongly degenerate elliptic equation,” in New Methods of Analysis Applied to Differential Equations, [in Russian], Vol. 1, Voronezh (1987) (in press).
B. Kvyadaras, “A strongly degenerate elliptic equation with analytic ocefficients,” in: Proceedings of the All-Union Symposium “Current Problems of Mathematical Physics” [in Russian], Tbilisi (1987) (in press).
B. Kvyadaras, “Application of Poincaré's method to the study of strongly degenerate elliptic equations,” in: Differential Equations and Their Application [in Russian], Vol. 30, Inst. Mat. Kibern. Vilnius (1981) pp. 9–26.
B. Kvyadaras, “Solution of a strongly degenerate eliptic equation with the help of Laplace integrals,” in: Differential Equations and Their Application [in Russian], Vol. 36, Inst. Mat. Kibern. (IMK), Vilnius (1984), pp. 26–39.
B. Kvyadaras, “Solvability of an integrodifferential equation with holomorphic coefficents,” Differential Equations and Their Application [in Russian], Vol. 40, Inst. Mat. Kibern. (IMK), Vilnius (1987), pp. 34–40.
B. Kvyadaras, “A system of degenerate integrodifferential equations,” in: Differential Equations and Their Application [in Russian], Vol. 38, Inst. Mat. Kibern. (IMK), Vilnius (1986), pp. 38–52.
Additional information
Institute of Mathematics and Cybernetics, Academy of Sciences of the Lithuanian SSR, Translated from Litovskii Matematicheskii Sbornik (Lietuvos Matematikos Rinkinys), Vol. 28, No. 4, pp. 690–698, October–December, 1988.
Rights and permissions
About this article
Cite this article
Kvedaras, B. Representation of solutions of strongly degenerate elliptic equations with analytic coefficients. Lith Math J 28, 336–342 (1988). https://doi.org/10.1007/BF00972216
Received:
Issue Date:
DOI: https://doi.org/10.1007/BF00972216