Ordinary and Partial Differential Equations pp 276-284 | Cite as
Properties of the set of global solutions for the cauchy problems in a locally convex topological vector space
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Cauchy Problem Topological Space Compact Subset Global Solution Topological Vector Space
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References
- 1.N. ARONSZAJN, Le correspondant topologique de l’unicité dans la théorie des équations différentielles, Ann. of Math. 43 (1942), 730–738.MathSciNetCrossRefMATHGoogle Scholar
- 2.K. BORSUK, Theory of Retracts, Polish Scientific Publishers, Warszawa (1967).MATHGoogle Scholar
- 3.F.E. BROWDER and C.P. GUPTA, Topological Degree and Nonlinear Mappings of Analytical type in Banach Spaces, J. Math. Anal. Appl. 26 (1969), 390–402.MathSciNetCrossRefMATHGoogle Scholar
- 4.A.I. BULGAKOV, Properties of Sets of Solutions of Differential Inclusions, Differential Equations 12 (1977), 683–687.MathSciNetMATHGoogle Scholar
- 5.J. DUBOIS and P. MORALES, On the Hukuhara-Kneser Property for some Cauchy Problems in Locally Convex Topological Vector Spaces, Proc. 1982 Dundee Conf. on Ordinary and Partial Differential Equations, Lect. Notes Math. 964, Springer-Verlag, New York (1982), 162–170.Google Scholar
- 6.J. DUGUNDJI, An extension of Tietze’s Theorem, Pacific J. Math. 1 (1951), 353–367.MathSciNetCrossRefMATHGoogle Scholar
- 7.J. KELLEY, General Topology, D. Van Nostrand Company, Inc. New York (1965).MATHGoogle Scholar
- 8.W.J. KNIGHT, Solutions of Differential Equations in B-Spaces, Duke Math. J. 41 (1974), 437–442.MathSciNetCrossRefMATHGoogle Scholar
- 9.J.M. LASRY and R. ROBERT, Analyse non linéaire multivoque, Cahier de Math. de la décision No. 7611, Paris (1978).Google Scholar
- 10.V.M. MILLIONSCIKOV, A contribution to the Theory of Differential Equations dx/dt = f(x, t) in Locally Convex Spaces, Soviet Math. Dokl. 1 (1960), 288–291.MathSciNetGoogle Scholar
- 11.R.S. PALAIS, Critical Point Theory and the Minimax Principle, Proc. Sympos. Pure Math., Vol. 15, Amer. Math. Soc., Providence (1970), 185–212.MathSciNetCrossRefMATHGoogle Scholar
- 12.R.S. PHILLIPS, Integration in a Convex Linear Topological Space, Trans. Amer. Math. Soc. 47 (1940), 114–145.MathSciNetCrossRefMATHGoogle Scholar
- 13.G. PULVIRENTI, Equazioni Differenziali in uno spazio di Banach. Teorema di esistenza e struttura del pennello delle soluzioni in ipotesi di Carathéodory, Ann. Mat. Pura Appl. 56 (1961), 281–300.MathSciNetCrossRefMATHGoogle Scholar
- 14.W. RUDIN, Functional Analysis, McGraw-Hill Book Company, New York (1973).MATHGoogle Scholar
- 15.A. STOKES, The application of a Fixed-Point Theorem to a variety of Nonlinear Stability Problems, Proc. Nat. Acad. Sci. U.S.A. 45 (1959), 231–235.MathSciNetCrossRefMATHGoogle Scholar
- 16.S. SZUFLA, Solution Sets of Nonlinear Equations, Bull. Acad. Polon. Sci., Sér. Sci. Math. Astronom. Physics 21 (1973), 971–976.MathSciNetMATHGoogle Scholar
- 17.S. SZUFLA, Some properties of the Solutions Set of Ordinary Differential Equations, Bull. Acad. Polon. Sci., Sér. Sci. Math. Astronom. Phys. 22 (1974), 675–678.MathSciNetMATHGoogle Scholar
- 18.S. SZUFLA, Sets of Fixed Points of Nonlinear Mappings in Function Spaces, Funkcial. Ekvac. 22 (1979), 121–126.MathSciNetMATHGoogle Scholar
- 19.A.A. TOLSTONOGOV, Comparison Theorems for Differential Inclusions in a Locally Convex Space. I. Existence of Solutions, Differential Equations 17 (1981), 443–449.MathSciNetMATHGoogle Scholar
- 20.A.A. TOLSTONOGOV, Comparison Theorems for Differential Inclusions in a Locally Convex Space, II. Properties of Solutions, Differential Equations 17 (1981), 648–654.MathSciNetMATHGoogle Scholar
- 21.A. WINTNER, The Non-Local Existence Problem of Ordinary Differential Equations, Amer. J. Math. 67 (1945), 277–284.MathSciNetCrossRefMATHGoogle Scholar
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