This short book provides a comprehensive and unified treatment of time-varying vector fields under a variety of regularity hypotheses, namely finitely differentiable, Lipschitz, smooth, holomorphic, and real analytic. The presentation of this material in the real analytic setting is new, as is the manner in which the various hypotheses are unified using functional analysis. Indeed, a major contribution of the book is the coherent development of locally convex topologies for the space of real analytic sections of a vector bundle, and the development of this in a manner that relates easily to classically known topologies in, for example, the finitely differentiable and smooth cases. The tools used in this development will be of use to researchers in the area of geometric functional analysis.
Spis treści
Introduction.- Fibre Metrics for Jet Bundles.- Finitely Differentiable, Lipschitz, and Smooth Topologies.- The COhol-topology for the Space of Holomorphic Vector Fields.- The Cw-topology for the Space of Real Analytic Vector Fields.- Time-Varying Vector Fields.- References.
O autorze
Saber Jafarpour is a Ph D candidate in Queen’s University’s Department of Mathematics and Statistics, Canada.
Andrew D. Lewis is a Professor of Mathematics at Queen’s University. His research interests include control of mechanical systems, geometric mechanics, and nonlinear control.
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