University of Birmingham > Talks@bham > Analysis seminar > Calderon_Zygmund (CZ) theory and Homogenization of Random Elliptic and Parabolic PDE

Calderon_Zygmund (CZ) theory and Homogenization of Random Elliptic and Parabolic PDE

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If you have a question about this talk, please contact José Cañizo.

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This talk will be concerned with some classical results (CZ and Aronson theorems) in harmonic analysis and their application to homogenization of linear uniformly elliptic and parabolic PDE with random coefficients. The CZ theorem (1952) concerns the boundedness of singular integral operators on p integrable functions. The Aronson theorem (1967) gives bounds on the Green’s function for uniformly elliptic and parabolic PDE which depend only on the ellipticity constant. We will show how these theorems can be used to obtain rate of convergence results in homogenization of PDE with random coefficients, and in Euclidean field theories with uniformly convex Lagrangians.

This talk is part of the Analysis seminar series.

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