About DML-CZ | FAQ | Conditions of Use | Math Archives | Contact Us
  Previous |  Up |  Next

Article

First Page Preview
Rzepecki, Bogdan
Existence of solutions of the Darboux problem for partial differential equations in Banach spaces. (English). Commentationes Mathematicae Universitatis Carolinae, vol. 28 (1987), issue 3, pp. 421-426
MSC: 34G20, 35A05, 35L15, 35L75, 47H10 | MR 912570 | Zbl 0638.35058
References:
[1] A. AMBROSETTI: Un teorema di esistenza per le equazioni differenziali negli spazi di Banach. Rend. Sem. Mat. Univ. Padova 39 (1967), 349-360. MR 0222426 | Zbl 0174.46001
[2] J. BANAŚ K. GOEBEL: Measure of Noncompactness in Banach Spaces. Lect. Notes Pure Applied Math. 60, Marcel Dekker, New York 1980. MR 0591679
[3] L. CASTELLANO: Sull' approssimazione, col metodo di Tonelli, delle soluzioni del problema di Darboux per l'equazione $u_{xyz} = f(x,y,z,u,u_x,u_y ,u_z)$. Le Matematiche 23 (1) (196B), 107-123. MR 0241830
[4] S. C. CHU J. B. DIAZ: The Coursat problem for the partial differential equation $u_xyz = f$. A mirage, J. Math. Mech. 16 (1967), 709-713. MR 0203264
[5] J. CONLAN: An existence theorem for the equation $u_xyz = f$. Arch. Rational Mech. Anal. 9 (1962), 64-76. MR 0132898
[6] J. DANEŠ: On densifying and related mappings and their application in nonlinear functional analysis. Theory of Nonlinear Operators, Akademie-Verlag, Berlin 1974, 15-46. MR 0361946
[7] K. DEIMLING: Ordinary Differential Equations in Banach Spaces. Lect. Notes in Math. 596, Springer-Verlag, Berlin 1977. MR 0463601 | Zbl 0361.34050
[8] M. FRASCA: Su un problema ai limiti per l'equazione $u_{xyz} = f(x,y,z,u,u_x,u_y,u_z)$. Matematiche (Catania) 21 (1966), 396-412. MR 0209673
[9] M. KWAPISZ B. PALCZEWSKI W. PAWELSKI: Sur l'équations et l'unicité des solutions de certaines équations differentielles du type $u_{xyz} = f(x,y,z,u,u_x,u_y,u_z,u_{xy},u_{xz},u_{yz})$. Arm. Polon. Math. 11 (1961), 75-106. MR 0136880
[10] R. D. NUSSBAUM: The fixed point index and fixed point theorems for k-set-contraction. Ph.D. dissertation, University of Chicago, 1969.
[11] B. PALCZEWSKI: Existence and uniqueness of solutions of the Darboux problem for the equation${\partial^3u}\over {\partial x_1 \partial x_2 \partial x_3} = f {(x_1, x_2, x_3, u, {{\partial u}\over{ \partial x_1}}, {{\partial u}\over{ \partial x_2}}, {{\partial u}\over{ \partial x_3}}, {{\partial^2 u}\over{ \partial x_1 \partial x_2}}, {{\partial^2 u}\over{ \partial x_1 \partial x_3}}, {{\partial^2 u}\over{ \partial x_2 \partial x_3}})}$. Ann. Polon. Math. 13 (1963), 267-277. MR 0157135 | Zbl 0168.07502
[12] B. N. SADOVSKII: Limit compact and condensing operators. Math. Surveys, 27 (1972), 86-144. MR 0428132
Partner of
EuDML logo