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151	Spectral Theory for Bounded Operators on Hilbert Space Stephen, Matthew A. 09 August 2013 (has links) This thesis is an exposition of spectral theory for bounded operators on Hilbert space. Detailed proofs are given for the functional calculus, the multiplication operator, and the projection-valued measure versions of the spectral theorem for self-adjoint bounded operators. These theorems are then generalized to finite sequences of self-adjoint and commuting bounded operators. Finally, normal bounded operators are discussed, as a particular case of the generalization. spectral theory Hilbert space bounded operators
152	Integral equations and evolution operators Freedman, Michael Aaron 05 1900 (has links) No description available. Operator equations Semigroups of operators Functional analysis
153	A fractal theory of iterated Markov operators with applications to digital image coding Jacquin, Arnaud E. 08 1900 (has links) No description available. Fractals Markov operators Image processing Digital techniques
154	Generalized inverses and Banach space decomposition Jory, Virginia Vickery 05 1900 (has links) No description available. Linear operators Generalized inverses Banach spaces
155	Closure operators on complete lattices with application to compactness. Brijlall, Deonarain. January 1995 (has links) No abstract available. / Thesis (M.Sc.)-University of Natal, Westville, 1995 Closure operators. Lattice theory. Theses--Mathematics.
156	Boundary value problems for elliptic operators with singular drift terms Kirsch, Josef January 2012 (has links) Let Ω be a Lipschitz domain in Rᴺ,n ≥ 3, and L = divA∇ - B∇ be a second order elliptic operator in divergence form with real coefficients such that A is a bounded elliptic matrix and the vector field B ɛ L∞loc(Ω) is divergence free and satisfies the growth condition dist(X,∂Ω)\|B(X)\|≤ ɛ1 for ɛ1 small in a neighbourhood of ∂Ω. For these elliptic operators we will study on the basis of the theory for elliptic operators without drift terms the Dirichlet problem for boundary data in Lp(∂Ω), 1 < p < ∞, and the regularity problem for boundary data in W¹,ᵖ(∂Ω) and HS¹. The main result of this thesis is that the solvability of the regularity problem for boundary data in HS1 implies the solvability of the adjoint Dirichlet problem for boundary data in Lᵖ'(∂Ω) and the solvability of the regularity problem with boundary data in W¹,ᵖ(∂Ω for some 1 < p < ∞. In [KP93] C.E. Kenig and J. Pipher have proven for elliptic operators without drift terms that the solvability of the regularity problem with boundary data in W¹,ᵖ(∂Ω) implies the solvability with boundary data in HS1. Thus the result of C.E. Kenig and J. Pipher and our main result complement a result in [DKP10], where it was shown for elliptic operators without drift terms that the Dirichlet problem with boundary data in BMO is solvable if and only if it is solvable for boundary data in Lᵖ(∂Ω) for some 1 < p < ∞. In order to prove the main result we will prove for the elliptic operators L the existence of a Green's function, the doubling property of the elliptic measure and a comparison principle for weak solutions, which are well known results for elliptic operators without drift terms. Moreover, the solvability of the continuous Dirichlet problem will be established for elliptic operators L = div(A∇+B)+C∇+D with B,C,D ɛ L∞loc(Ω) such that in a small neighbourhood of ∂Ω we have that dist(X,∂Ω)(\|B(X)\| + \|C(X)\| + \|D(X)\|) ≤ ɛ1 for ɛ1 small and that the vector field B satisfies \|∫B∇Ø\| ≤ C∫\|∇Ø\| for all Ø ɛ Wₒ¹'¹ of that neighbourhood. 515
157	The algebraic construction of invariant differential operators Baston, Robert J. January 1985 (has links) Let G be a complex semisimple Lie Group with parabolic subgroup P, so that G/P is a generalized flag manifold. An algebraic construction of invariant differential operators between sections of homogeneous bundles over such spaces is given and it is shown how this leads to the classification of all such operators. As an example of a process which naturally generates such operators, the algebraic Penrose transform between generalized flag manifolds is given and computed for several cases, extending standard results in Twistor Theory to higher dimensions. It is then shown how to adapt the homogeneous construction to manifolds with a certain class of tangent bundle structure, including conformal manifolds. This leads to a natural definition of invariant differential operators on such manifolds, and an algebraic method for their construction. A curved analogue of the Penrose transform is given. 510
158	An index formula for Toeplitz operators Fedchenko, Dmitry, Tarkhanov, Nikolai January 2014 (has links) We prove a Fedosov index formula for the index of Toeplitz operators connected with the Hardy space of solutions to an elliptic system of first order partial differential equations in a bounded domain of Euclidean space with infinitely differentiable boundary. Toeplitz operators Fredholm property index Mathematics
159	Zur Theorie der Dirichletschen Randwertaufgabe zum Operator ²-k⁴ im Innen- und Aussenraum mit der Integralgleichungsmethode Wickel, Wolfram, January 1973 (has links) Thesis--Bonn. / Vita. Includes bibliographical references (p. 74-75).
160	Spaces of operators containing c₀ and/or ℓ[infinity] with an application of vector measures Schulle, Polly Jane. Bator, Elizabeth M., January 2008 (has links) Thesis (Ph. D.)--University of North Texas, August, 2008. / Title from title page display. Includes bibliographical references.

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