Functional differential equations and bifurcation : proceedings of a conference held at São Carlos, Brazil, July 2-7, 1979
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Bibliographic Information
Functional differential equations and bifurcation : proceedings of a conference held at São Carlos, Brazil, July 2-7, 1979
(Lecture notes in mathematics, 799)
Springer-Verlag, 1980
- : Berlin
- : New York
Available at / 74 libraries
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Library, Research Institute for Mathematical Sciences, Kyoto University数研
L/N||LNM||7998007041S
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Hokkaido University, Library, Graduate School of Science, Faculty of Science and School of Science研究室
: Berlin510/L4972021077658
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Note
Includes bibliographies and index
Description and Table of Contents
Table of Contents
Lienard equations and control.- Periodic solutions of semilinear functional differential equations in a Hilbert space.- Stability of nonconservative linear systems.- An analysis of the characteristic equation of the scalar linear difference equation with two delays.- A liapunov functional for a matrix retarded difference-differential equation with several delay.- A compactness theorem for integral operators and applications.- Periodic solutions of nonlinear autonomous hyperbolic equations.- Contact equivalence and bifurcation theory.- Some recent results on dissipative processes.- Volterra stieltjes-integral equations.- Relationship in the neighbourhood of infinity and asymptotic equivalence of neutral functional differential equations.- Stability in functional differential equations.- Topological equivalence in bifurcation theory.- On a Hartree type equation: Existence of regular solutions.- Approximation - solvability of some nonlinear operator equations with applications.- The levin-nohel equation on the torus.- Non-singular structural stable flows on three-dimensional manifolds.- Qualitative properties of certain ordinary differential systems.- Applications of the integral averaging bifurcation method to retarded functional differential equations.- Moduli and bifurcations: Non-transversal intersections of invariant manifolds of vectorfields.- Stability properties in almost periodic systems of functional differential equations.
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