Global ETD Search

21	Fast solvers for Toeplitz systems with applications to image restoration Wen, Youwei., 文有為. January 2006 (has links) published_or_final_version / abstract / Mathematics / Doctoral / Doctor of Philosophy Image reconstruction. Toeplitz matrices. Algorithms.
22	Eigenvalues of toeplitz determinants Coppin, Graham January 1990 (has links) A research report submitted to the Faculty of Science, University of the Witwatersrand, in partial fulfillment of the degree of Master of Science. / The Toeplitz form is a most useful and important teo! in many areas of applied. mathematics today including signal processing, time-series analysis and prediction theory. It is even used in quantum mechanics in Ising model correlation functions. (Abbreviation abstract) / AC 2018 Toeplitz matrices Eigenvalues Orthogonal polynomials
23	Fast solvers for Toeplitz systems with applications to image restoration Wen, Youwei. January 2006 (has links) Thesis (Ph. D.)--University of Hong Kong, 2006. / Title proper from title frame. Also available in printed format.
24	Operators which are constant with respect to slant Toeplitz operators Chen, Chien-chou 04 July 2006 (has links) Let H be a separable Hilbert space and {e_n : n belong to Z} be an orthonormal basis in H. A bounded operator T is called the slant Toeplitz operator if <T ej , ei> =c2i−j , where c_n is the n-th Fourier series of a bounded Lebesgue measurable function on the unit circle T = {z belong to C : \|z\| = 1}. It has been shown [7] that T* is an isometry if and only if \|fi(z)\|^2 +\|fi(−z)\|^2 = 2 a.e. on T and if this is the case and fi belong to C(T), then either T is unitarily equivalent to a shift or to the direct sum of a shift and a rank one unitary, with infinite multiplicity (for the shift part, that is). Moreover, with some additional assumption on the smoothness and the zeros of fi, T* is similar to either the constant multiple of a shift or to the constant multiple of the direct sum of a shift and a rank one unitary, with infinite multiplicity. On the other hand, according to the terminologies in [10], an operator A that is constant with respect to a shift S if AS = SA and A S = SA . Therefore, in this article, we will study the operators that is constant with respect to T , i.e., bounded operator A satisfying AT = T A and A T = T A . shift constant slant Toeplitz operator
25	Block toeplitz type preconditioners for elliptic problem 王朝光, Wong, Chiu-kwong. January 1994 (has links) published_or_final_version / Mathematics / Master / Master of Philosophy Toeplitz matrices. Differential equations, Elliptic.
26	Fast iterative methods for solving Toeplitz and Toeplitz-like systems Ng, Kwok-po., 吳國寶. January 1992 (has links) published_or_final_version / Mathematics / Master / Master of Philosophy Iterative methods (Mathematics) Toeplitz matrices.
27	Block toeplitz type preconditioners for elliptic problem / Wong, Chiu-kwong. January 1994 (has links) Thesis (M. Phil.)--University of Hong Kong, 1994. / Includes bibliographical references (leaves 40-42).
28	Fast iterative methods for solving Toeplitz and Toeplitz-like systems / Ng, Kwok-po. January 1992 (has links) Thesis (M. Phil.)--University of Hong Kong, 1993. / Photocopy typescript.
29	The Relative Nuclear Dimension of C-Algebras, and the Nuclear Dimension of Generalised Toeplitz Algebras Gardner, Ruaridh* 28 June 2021 (has links) We consider the class of generalised Toeplitz algebras; those C-algebras that can be expressed as an extension of C(X) by the compact operators K, for some compact metrizable space X. We show that one can generalise the result of Brake and Winter, that the nuclear dimension of the Toeplitz algebra is 1, to show that for any generalised Toeplitz algebra its nuclear dimension must be equal to dim_nuc C(X). This shows that Brake and Winter's dimension reduction phenomenon is applicable to a much wider class of algebras. We also introduce our definition for the relative nuclear dimension of a C-algebra. This is a modification to the definition of nuclear dimension that requires us to factor through algebras of the form F \otimes B for F finite dimensional and B some fixed algebra we are working relative to. We explore various properties satisfied by the relative nuclear dimension with a particular eye to its being a modification of nuclear dimension. Mathematics C* Nuclear Dimension Toeplitz
30	Novel structures for very fast adaptive filters McWhorter, Francis LeRoy January 1990 (has links) No description available. adaptive filters Toeplitz matrices algorithms

Page generated in 0.0347 seconds