Mousehole contour integration method: Difference between revisions

Revision as of 23:00, 27 April 2008

Description

The mousehole contour integration method is a method used for computing Cauchy principal values for integrals of real-valued functions $f:\mathbb {R} ^{*}\to \mathbb {R}$ , that may blow up at zero.

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	The '''mousehole contour integration method''' is a method used for computing [[Cauchy principal value]]s for integrals of real-valued functions <math>f: \R^* \to \R</math>, that may blow up at zero.		The '''mousehole contour integration method''' is a method used for computing [[Cauchy principal value]]s for integrals of real-valued functions <math>f: \R^* \to \R</math>, that may blow up at zero.

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