Authors: Otto Vejvoda Miroslav Sova Milan Stedry Ivan Straskaba. Also, the arguments and procedures which are repeated in the book are presented more briefly when met again, the reader being expected to become gradually more thoroughly.
Authors: Otto Vejvoda Miroslav Sova Milan Stedry Ivan Straskaba. more Vladimir Lovicar L Herrmann. Also, the arguments and procedures which are repeated in the book are presented more briefly when met again, the reader being expected to become gradually more thoroughly acquainted with them. The authors have tried to provide a complete bibliography of all relevant publications (their number reaches about 500) from the theory of time-periodic solutions to non-linear partial and abstract differential equations whose origin may be put in the early thirties of this century.
Partial differential equations time-periodic solutions by Otto Vejvoda, L. Herrmann, V. Lovicar, M. Sova, I. Straskaba, M. Stedry Hardcover, 358 Pages, Published 1982 by Springer ISBN-13: 978-90-247-2772-8, ISBN: 90-247-2772-3.
Author Vejvoda, Otto, Sova, Miroslav, Stedry, Milan, Straskaba, Ivan, Lovicar, Vladimir, Herrmann, L.
Partial Differential Equations - Time-Periodic Solutions. Subtitle Time-Periodic Solutions. ISBN13: 9789024727728. More Books . ABOUT CHEGG.
Mathematics Dynamical Systems & Differential Equations. Partial differential equations: time-periodic solutions. Authors: Vejvoda, Otto. Hardcover 249,00 €. price for Russian Federation (gross). Firstly, it proceeds from concrete problems to abstract ones, and secondly, all considerations and procedures are presented in much detail when met for the first time (such very elementary expositions can be found especially at the beginning of Chapters III and V). Finally, the authors focus their attention on elementary problems which can be dealt with by relatively simple methods.
Herrmann, O. Vejvoda: Periodic and quasi-periodic solutions of abstract differential equations. Al. I. Cuza Iaşi Secţ,. M. Štědrý, O. Vejvoda: Small time-periodic solutions of equations of as a singularly perturbed problem. Apl. Mat. 28 (1983), 344–356. O. Vejvoda, M. Štědrý: Existence of classical periodic solutions of the wave equation. The relation of the number-theoretic character of the period and the geometric properties of solutions.
Vejvoda, L. Straskraba, and M. Stedry, Partial Differential Equations: Time-Periodic Solutions, Martinus Nijhoff, London, 1982. A. Zygmund, Trigonometric Series, 2nd e. vol. 1, 2, Cambridge University Press, New York, 1959
Vejvoda, L. 1, 2, Cambridge University Press, New York, 1959. Y. S. Eidelman: School of Mathematical Sciences, Tel Aviv University, Ramat-Aviv 66978, Israel I. V. Tikhonov: Department of Mathematics and Mechanics, Moscow State University, Moscow 119899, Russia.
We study periodic solutions of the differential equation. Vejvoda, L. Zentralblatt MATH: 50. 5001.
We relate the existence of almost periodic solutions with the stabilization . These studies are aimed at regular solutions of partial diﬀerential equations.
We relate the existence of almost periodic solutions with the stabilization of distributed control systems. Moreover, the study of more general solutions of ARFDEs where the operator acting on. delay term is unbounded has been addressed in recent work.
The time-periodic problem is studied for a nonlinear telegraph equation with the .
The time-periodic problem is studied for a nonlinear telegraph equation with the Dirichlet–Poincaré boundary conditions. The questions are considered of existence and smoothness of solutions to this problem. Partial Differential Equations: Time-Periodic Solutions Sijthoff & Noordhoff, Alpeen aan den Rijn, The Netherlands. Vejvoda et a. " Partial Differential Equations: Time-Periodic Solutions, " Sijthoff & Noordhoff, Alpeen aan den Rijn, The Netherlands, 1981. Soluzioni quasi-periodiche dell’equazione non omogenea delle onde con termine dissipativo quadratico.