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41	Two problems in the theory of Toeplitz operators on the Bergman space / Yousef, Abdelrahman F. January 2009 (has links) Dissertation (Ph.D.)--University of Toledo, 2009. / Typescript. "Submitted as partial fulfillment of the requirements for the Doctor of Philosophy Degree in Mathematics." Bibliography: leaves 57-59. Bergman spaces. Toeplitz operators.
42	Weighted composition operators between Lp-spaces / Lo, Ching-on. January 2002 (has links) Thesis (M. Phil.)--University of Hong Kong, 2002. / Includes bibliographical references (leaves 51-52). Composition operators. Lp spaces.
43	Abstract backward shifts of finite multiplicity / Raney, Michael W., January 2002 (has links) Thesis (Ph. D.)--University of Oregon, 2002. / Typescript. Includes vita and abstract. Includes bibliographical references (leaf 55). Also available for download via the World Wide Web; free to University of Oregon users. Hilbert space. Linear operators.
44	Preservers of generalized numerical ranges Chan, Kong., 陳鋼. January 2013 (has links) Let B(H) denote the C^*-algebra of all bounded linear operators on a complex Hilbert space H. For A ∈ B(H) and c = 〖(c1, . . . , cn)〗^t ∈ C^n with n being a positive integer such that n ≤ dim H, the c-numerical range and c-numerical radius of A are defined by W_e (A)= {∑_(i=1)^n▒c_i 〈〖Ax〗_i, x_i 〉 : {x_1, …, x_n } is an orthonormal set in H} and W_C (A)={\|z\| :z ∈W_(c ) (A)} respectively. When c = 〖(1, 0, . . . , 0)〗^t, Wc(A) reduces to the classical numerical range W(A). Preserver problems concern the characterization of maps between spaces of bounded linear operators that leave invariant certain functions, subsets, or relations etc. In this thesis, several preserver problems related to the numerical range or its generalizations were studied. For A ∈ B(H), the diameter of its numerical range is d_w(A) = sup{\|a - b\| : a, b ∈ W(A)}. The first result in this thesis was a characterization of linear surjections on B(H) preserving the diameter of the numerical range, i.e., linear surjections T : B(H) → B(H) satisfying d_w(T(A)) =d_w(A) for all A ∈ B(H) were characterized. Let Mn be the set of n × n complex matrices and Tn the set of upper triangular matrices in Mn. Suppose c = 〖(c1, . . . , cn)〗^t ∈ R^n. When wc(·) is a norm on Mn, mappings T on Mn (or Tn) satisfying wc(T(A) - T(B)) = wc(A - B) for all A,B were characterized. Let V be either B(H) or the set of all self-adjoint operators in B(H). Suppose V^n is the set of n-tuples of bounded operators Â = (A1, . . . ,An), with each Ai ∈ V. The joint numerical radius of Â is defined by w(Â) = sup{\|\|(⟨A1x, x⟩, . . . , ⟨Anx, x⟩)∥ : x ∈ H, ∥x∥ = 1}, where ∥ · ∥ is the usual Euclidean norm on F^n with F = C or R. When H is infinite-dimensional, surjective linear maps T : V^n→V^n satisfying w(T(Â)) = w(Â) for all Â ∈ V^n were characterized. Another generalization of the numerical range is the Davis-Wielandt shell. For A ∈ B(H), its Davis-Wielandt shell is DW(A) = {(⟨Ax, x⟩, ⟨Ax, Ax⟩): x ∈ H and∥x∥= 1}. Define the Davis-Wielandt radius of A by dw(A) = sup{(√(\|⟨Ax, x⟩ \|^2 + \|⟨Ax, Ax⟩ \|^2) : x ∈ H and ∥x∥= 1}. Its properties and relations with normaloid matrices were investigated. Surjective mappings T on B(H) satisfying dw(T(A) - T(B))= dw(A - B) for all A,B ∈ B(H) were also characterized. A characterization of real linear surjective isometries on B(H) by Dang was used to prove the preserver result about the Davis-Wielandt radius. The result of Dang is proved by advanced techniques and is applicable on a more general setting than B(H). In this thesis, the characterization of surjective real linear isometries on B(H) was re-proved using elementary operator theory techniques. / published_or_final_version / Mathematics / Doctoral / Doctor of Philosophy Linear operators. Matrices.
45	Linear preservers of operators with non-negative generalized numericalranges 陳鋼, Chan, Kong. January 1999 (has links) published_or_final_version / abstract / toc / Mathematics / Master / Master of Philosophy Linear operators. Matrices.
46	Weighted composition operators between Lp-spaces 盧靜安, Lo, Ching-on. January 2002 (has links) published_or_final_version / abstract / toc / Mathematics / Master / Master of Philosophy Composition operators. Lp spaces.
47	LINEAR OPERATORS IN APPROXIMATION THEORY Radatz, Peter Richard, 1943- January 1974 (has links) No description available. Linear operators. Approximation theory.
48	Eigenvalue gaps for self-adjoint operators Michel, Patricia L. 08 1900 (has links) No description available. Eigenvalues Selfadjoint operators
49	An algorithm for finite dimensional approximations of solutions to infinite dimensional problems Hubbard, Elaine Marjorie 12 1900 (has links) No description available. Convergence Algorithms Linear operators
50	Extensions of the concept of derivative to all monotone functions Withers, William Douglas 08 1900 (has links) No description available. Operator theory Monotone operators

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