Please use this identifier to cite or link to this item: http://repositorio.ufc.br/handle/riufc/60059
Type: Artigo de Evento
Title: Algebraic Characterization of the Cost Function for Discrete Transversal Filters
Title in English: Algebraic Characterization of the Cost Function for Discrete Transversal Filters
Authors: Bluhm, Rafael de Carvalho
Cavalcante, Charles Casimiro
Keywords: Cost Function;Correlation;Bilinear Transform;Tensor Product
Issue Date: 2018
Publisher: https://www.sbrt.org.br/sbrt2018
Citation: BLUHM, Rafael de Carvalho; CAVALCANTE, Charles Casimiro. Algebraic characterization of the cost function for discrete transversal filters. In: SIMPÓSIO BRASILEIRO DE TELECOMUNICAÇÕES E PROCESSAMENTO DE SINAIS – SbrT, XXXVI., 16 a 19 set. 2018. Campina Grande-PB. Anais[…], Campina Grande-PB, 2018.p.598-599.
Abstract in Brazilian Portuguese: This article deals with the algebraic structure of the real case cost function, present in the analysis of Wiener filters. The correlation written as a decomposable tensor comes from the isomorphism of the multiplication of inner products and linear operators, and for general bases does not have the same representation in terms of the components. This difference is the object of this study.
Abstract: This article deals with the algebraic structure of the real case cost function, present in the analysis of Wiener filters. The correlation written as a decomposable tensor comes from the isomorphism of the multiplication of inner products and linear operators, and for general bases does not have the same representation in terms of the components. This difference is the object of this study.
URI: http://www.repositorio.ufc.br/handle/riufc/60059
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