Rapidly Growing Fourier Integrals Erik Talvila 1. THE RIEMANN–LEBESGUE LEMMA. In its usual form, the Riemann– ∞ Lebesgue Lemma reads as follows: If f ∈ L 1 and fˆ(s) = −∞ eisx f (x) d x is its Fourier trans

First Page		Document Content
Date: 2011-01-09 20:10:19 Integral calculus Integral transforms Fourier transform Fourier series Improper integral Integration by parts Bessel function Integral Riemann–Lebesgue lemma Mathematical analysis Fourier analysis Joseph Fourier		Rapidly Growing Fourier Integrals Erik Talvila 1. THE RIEMANN–LEBESGUE LEMMA. In its usual form, the Riemann– ∞ Lebesgue Lemma reads as follows: If f ∈ L 1 and fˆ(s) = −∞ eisx f (x) d x is its Fourier trans Add to Reading List Source URL: www.math.ualberta.ca Download Document from Source Website File Size: 89,13 KB Share Document on Facebook

	Daniel Rockmore Department of Mathematics Dartmouth College Hanover, NHTelephone: (whFax: ( DocID: 1rtPN - View Document
	SOME TRANSFORMS IN FUNCTIONAL ANALYSIS VIPUL NAIK Abstract. This article describes some of the ideas and concerns that one needs to keep in mind when performing transforms in functional analysis. DocID: 1r5nj - View Document
	Mining Recurrent Activities: Fourier Analysis of Change Events Abram Hindle University of Waterloo Waterloo, Ontario Canada DocID: 1qUHR - View Document
	Pseudocode for Riesz Pyramids for Fast Phase-Based Video Magnification Neal Wadhwa, Michael Rubinstein, Fr´edo Durand and William T. Freeman This document contains pseudocode for the 2014 ICCP paper Riesz Pyramids for F DocID: 1qUiC - View Document
	doi:j.imavis DocID: 1qH1A - View Document