Article

Characterization of generalized Young measures in the context of A-quasiconvexity and application to lower semicontinuity

Indiana University Mathematics Journal

M. Baía; J. Matias; P.M.Santos2013Indiana University Press

Key information

Authors:

M. Baía (Margarida Maria Das Neves Estêvão Baía); J. Matias; P.M.Santos (Pedro Miguel de Matos da Silva Santos)

Published in

2013

Abstract

This work is devoted to the characterization of generalized Young measures generated by sequences of bounded Radon measures {μn} ⊂ 𝓜(Ω; ℝd) (with Ω ⊂ ℝN an open bounded set), such that {𝒜μn} converges to zero strongly in W–1,q for some q ∈ (1,N/(N – 1)), and such that 𝒜 is a firstorder partial differential operator with constant rank.

Publication details

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Publisher

Indiana University Press

Link to the publisher's version

https://www.jstor.org/stable/24904148

Title of the publication container

Indiana University Mathematics Journal

First page or article number

487

Last page

521

Volume

62

Issue

2

Fields of Science and Technology (FOS)

mathematics - Mathematics

Publication language (ISO code)

eng - English

Rights type:

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