We show basic characterizations of Hilbert spaces and the vector -valued Littlewood-Paley and Fourier multipliers theorems. We also show the operator-valued Fourier multiplier theorem and maximal L_p-regularity. We study the behavior of inner functions and summability kernels for the Lebesgue space multipliers. We investigate the multipliers in Hardy-Sobolev spaces and show remarks on vector-valued BMOA and vector-valued multipliers. We develop a very general operator-valued functional calculus for operators with an H^¿ -calculus. We study the operator -valued Fourier multiplier theorem on the Lebesgue space and geometry of Banach spaces. We give the Gaussian estimates and the L^p-boundedness of Riesz means. The Plancerel-type estimates and sharp spectral multipliers are considered.
Sprache
Produkt-Hinweis
Broschur/Paperback
Klebebindung
Maße
Höhe: 220 mm
Breite: 150 mm
Dicke: 20 mm
Gewicht
ISBN-13
978-620-8-32611-1 (9786208326111)
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Schweitzer Klassifikation
I worked at King Khalid University, Faculty of science, Math department from 8/2015 to 8/2022 as an Assistant Prof of Math, where I taught different courses of Math, namely Applied Math, Real Analysis, Complex Analysis, Numerlical Analysis, differential Equations, etc.
