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21	Harmonic analysis of banach space valued functions in the study of parabolic evolution equations Portal, Pierre, January 2004 (has links) Thesis (Ph. D.)--University of Missouri-Columbia, 2004. / Typescript. Vita. Includes bibliographical references (leaves 125-136) and index. Also available on the Internet.
22	Harmonic analysis of banach space valued functions in the study of parabolic evolution equations / Portal, Pierre, January 2004 (has links) Thesis (Ph. D.)--University of Missouri-Columbia, 2004. / Typescript. Vita. Includes bibliographical references (leaves 125-136) and index. Also available on the Internet.
23	Constrained evolution in numerical relativity Anderson, Matthew William, Matzner, Richard A. January 2004 (has links) (PDF) Thesis (Ph. D.)--University of Texas at Austin, 2004. / Supervisor: Richard Matzner. Vita. Includes bibliographical references. Available also from UMI company.
24	Nonlinear evolution equations and optimization problems in Banach spaces Lee, Haewon. January 2005 (has links) Thesis (Ph.D.)--Ohio University, August, 2005. / Title from PDF t.p. Includes bibliographical references (p. 79-93)
25	Linear instability for incompressible inviscid fluid flows : two classes of perturbations Thoren, Elizabeth Erin 20 October 2009 (has links) One approach to examining the stability of a fluid flow is to linearize the evolution equation at an equilibrium and determine (if possible) the stability of the resulting linear evolution equation. In this dissertation, the space of perturbations of the equilibrium flow is split into two classes and growth of the linear evolution operator on each class is analyzed. Our classification of perturbations is most naturally described in V.I. Arnold’s geometric view of fluid dynamics. The first class of perturbations we examine are those that preserve the topology of vortex lines and the second class is the factor space corresponding to the first class. In this dissertation we establish lower bounds for the essential spectral radius of the linear evolution operator restricted to each class of perturbations. / text Fluid flow Linear evolution equations Linear evolution operator Perturbations Fluid flow stability Fluid dynamics mathematics
26	On the spectrum of positive operators Unknown Date (has links) Spectral theory, mathematical system theory, evolution equations, differential and difference equations [electronic resource] : 21st International Workshop on Operator Theory and Applications, Berlin, July 2010.It is known that lattice homomorphisms and G-solvable positive operators on Banach lattices have cyclic peripheral spectrum (See [17]). In my thesis I prove that positive contractions whose spectral radius is 1 on Banach lattices with increasing norm have cyclic peripheral point spectrum. I also prove that if the Banach lattice is a K B space satisfying the growth conditon and º is an eigenvalue of a positive contraction T such that [º] = 1, then 1 is also an eigenvalue of T as well as an eigenvalue of T¨, the dual of T. I also investigate the conditions on contraction operators on Hilbert lattices and AL-spaces which guanantee that 1 is an eigenvalue. As we know from [17], if T : E-E is a positive ideal irreducible operator on E such the r (T) = 1 is a pole of the resolvent R(º, T), then r (T) is simple pole with dimN (T -r(T)I) and ºper(T) is cyclic. Also all points of ºper(T) are simple poles of the resolvent R(º,T). SInce band irreducibility and º-order continuity do not imply ideal irreducibility [2], we prove the analogous results for band irreducible, º-order continuous operators. / by Cheban P. Acharya. / Thesis (Ph.D.)--Florida Atlantic University, 2012. / Includes bibliography. / Mode of access: World Wide Web. / System requirements: Adobe Reader. Operator theory Evolution equations Banach spaces Linear topological spaces Functional analysis
27	Forced Brakke flows Graham, David(David Warwick),1976- January 2003 (has links) For thesis abstract select View Thesis Title, Contents and Abstract Geometric measure theory Evolution equations, Nonlinear Flows (Differentiable dynamical systems) Curvature
28	Forced Brakke flows Graham, David (David Warwick), 1976- January 2003 (has links) Abstract not available Geometric measure theory Evolution equations, Nonlinear Flows (Differentiable dynamical systems) Curvature
29	Evolution equations and vector-valued Lp spaces: Strichartz estimates and symmetric diffusion semigroups. Taggart, Robert James, Mathematics & Statistics, Faculty of Science, UNSW January 2008 (has links) The results of this thesis are motivated by the investigation of abstract Cauchy problems. Our primary contribution is encapsulated in two new theorems. The first main theorem is a generalisation of a result of E. M. Stein. In particular, we show that every symmetric diffusion semigroup acting on a complex-valued Lebesgue space has a tensor product extension to a UMD-valued Lebesgue space that can be continued analytically to sectors of the complex plane. Moreover, this analytic continuation exhibits pointwise convergence almost everywhere. Both conclusions hold provided that the UMD space satisfies a geometric condition that is weak enough to include many classical spaces. The theorem is proved by showing that every symmetric diffusion semigroup is dominated by a positive symmetric diffusion semigoup. This allows us to obtain (a) the existence of the semigroup's tensor extension, (b) a vector-valued version of the Hopf--Dunford--Schwartz ergodic theorem and (c) an holomorphic functional calculus for the extension's generator. The ergodic theorem is used to prove a vector-valued version of a maximal theorem by Stein, which, when combined with the functional calculus, proves the pointwise convergence theorem. The second part of the thesis proves the existence of abstract Strichartz estimates for any evolution family of operators that satisfies an abstract energy and dispersive estimate. Some of these Strichartz estimates were already announced, without proof, by M. Keel and T. Tao. Those estimates which are not included in their result are new, and are an abstract extension of inhomogeneous estimates recently obtained by D. Foschi. When applied to physical problems, our abstract estimates give new inhomogeneous Strichartz estimates for the wave equation, extend the range of inhomogeneous estimates obtained by M. Nakamura and T. Ozawa for a class of Klein--Gordon equations, and recover the inhomogeneous estimates for the Schr??dinger equation obtained independently by Foschi and M. Vilela. These abstract estimates are applicable to a range of other problems, such as the Schr??dinger equation with a certain class of potentials. Strichartz estimates Symmetric diffusion semigroups Mathematical analysis Evolution equations Vector valued functions
30	An Optimal Transport Approach to Nonlinear Evolution Equations Kamalinejad, Ehsan 13 December 2012 (has links) Gradient flows of energy functionals on the space of probability measures with Wasserstein metric has proved to be a strong tool in studying certain mass conserving evolution equations. Such gradient flows provide an alternate formulation for the solutions of the corresponding evolution equations. An important condition, which is known to guarantees existence, uniqueness, and continuous dependence on initial data is that the corresponding energy functional be displacement convex. We introduce a relaxed notion of displacement convexity and we show that it still guarantees short time existence and uniqueness of Wasserstein gradient flows for higher order energy functionals which are not displacement convex in the standard sense. This extends the applicability of the gradient flow approach to larger family of energies. As an application, local and global well-posedness of different higher order non-linear evolution equations are derived. Examples include the thin-film equation and the quantum drift diffusion equation in one spatial variable. Nonlinear Evolution Equations Optimal Transport Wasserstein Gradient Flows Well-posedness 0405

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