Artstein, Zvi Topological dynamics of ordinary differential equations and Kurzweil equations. (English) Zbl 0353.34044 J. Differ. Equations 23, 224-243 (1977). Page: −5 −4 −3 −2 −1 ±0 +1 +2 +3 +4 +5 Show Scanned Page Cited in 1 ReviewCited in 30 Documents MSC: 37-XX Dynamical systems and ergodic theory 54H20 Topological dynamics (MSC2010) PDF BibTeX XML Cite \textit{Z. Artstein}, J. Differ. Equations 23, 224--243 (1977; Zbl 0353.34044) Full Text: DOI References: [1] Artstein, Z., Topological dynamics of an ordinary differential equation, J. Differential Equations, 23, 216-223 (1977) · Zbl 0353.34043 [2] Imaz, C.; Vozel, Z., Generalized ordinary differential equations in Banach space and applications to functional equations, Bol. Soc. Mat. Mexicana, 10, 47-59 (1966) · Zbl 0178.44203 [3] Kurzweil, J., Generalized ordinary differential equations and continuous dependence on a parameter, Czechoslovak Math. J., 7, 418-449 (1957) · Zbl 0090.30002 [4] Kurzweil, J., Addition to Generalized ordinary differential equations and continuous dependence on a parameter, Czechoslovak Math. J., 9, 84, 564-573 (1959) · Zbl 0094.05902 [5] Kurzweil, J., Generalized ordinary differential equations, Czechoslovak Math. J., 8, 83, 360-389 (1958) · Zbl 0094.05804 [6] Kurzweil, J., Unicity of solutions of generalized differential equations, Czechoslovak Math. J., 8, 83, 502-504 (1958) · Zbl 0094.05901 [7] Kurzweil, J., Problems which lead to a generalization of the concept of an ordinary differential equation, (“Differential Equations and Their Applications,” Proc. of a Conference. “Differential Equations and Their Applications,” Proc. of a Conference, Prague, September 1962 (1963), Academic Press: Academic Press New York), 65-76 · Zbl 0151.12501 [8] LaSalle, J. P., Invariance principles and stability theory for nonautonomous systems, (Proceedings Greek Math. Society, Caratheodory Symposium. Proceedings Greek Math. Society, Caratheodory Symposium, Athens (September 1973)), 397-408 [9] Levin, J. J.; Nohel, J. A., Global asymptotic stability for nonlinear systems of differential equations and applications to reactor dynamics, Arch. Rational Mech. Anal., 5, 194-211 (1960) · Zbl 0094.06402 [10] Miller, R. K., Almost periodic differential equations as dynamical systems with applications to the existence of a.p. solutions, J. Differential Equations, 1, 337-345 (1965) · Zbl 0144.11301 [11] Miller, R. K.; Sell, G. R., Topological dynamics and its relation to integral equations and nonautonomous systems, (Dynamical Systems, An International Symposium, Vol. I (1976), Academic Press: Academic Press New York), 223-249 [12] Sell, G. R., Nonautonomous differential equations and topological dynamical I and II, Trans. Amer. Math. Soc., 127, 241-283 (1967) · Zbl 0189.39602 [13] Sell, G. R., Lectures on Topological Dynamics and Differential Equations (1971), Von Nostrand-Reinhold: Von Nostrand-Reinhold London · Zbl 0212.29202 [14] Strauss, A.; Yorke, J. A., On asymptotically autonomous differential equations, Math. Systems Theory, 1, 175-182 (1967) · Zbl 0189.38502 [15] Vrkoc, I., A note to the unicity of generalized differential equations, Czechoslovak Math. J., 8, 83, 510-512 (1958) · Zbl 0142.34602 [16] Wakeman, D. R., An application of topological dynamics to obtain a new invariance property for nonautonomous ordinary differential equations, J. Differential Equations, 17, 259-295 (1975) · Zbl 0431.34033 This reference list is based on information provided by the publisher or from digital mathematics libraries. Its items are heuristically matched to zbMATH identifiers and may contain data conversion errors. It attempts to reflect the references listed in the original paper as accurately as possible without claiming the completeness or perfect precision of the matching.