JIPAM - Journal of Inequalities in Pure and Applied Mathematics

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Dirichlet Green Functions for Parabolic Operators with Singular Lower-Order Terms


	Authors:	Lotfi Riahi,
	Keywords:	Green function, Parabolic operator, Initial-Dirichlet problem, Boundary behavior, Singular potential, Singular drift term, Radon measure, Schrödinger heat kernel, Parabolic Kato class.
	Date Received:	15/03/06
	Date Accepted:	10/04/07
	Subject Codes:	34B27, 35K10.
	Editors:	Sever S. Dragomir,


	Abstract:	We prove the existence and uniqueness of a continuous Green function for the parabolic operator $L={partial/ {partial t}}-mathrm{div} (A(x,t)nabla_x)+nucdotnabla_x + mu$ with the initial Dirichlet boundary condition on a $C^{1,1}$ -cylindrical domain $Omegasubset mathbb{R} ^ntimes mathbb{R}, ngeq 1$ , satisfying lower and upper estimates, where and are in general classes of signed Radon measures covering the well known parabolic Kato classes.;

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