Deterministic homogenization of weakly damped nonlinear hyperbolic-parabolic equations (Q1928843)

The sigma-convergence method is applied to a class of highly oscillatory nonlinear evolution problems (with properly scaled linear damping) that converge in the limit \(\epsilon\to 0\) to a quasilinear homogenized hyperbolic-parabolic problem.

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reviewed by

Adrian Muntean

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zbMATH Keywords

homogenization

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nonlinear operators

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hyperbolic-parabolic problems

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MaRDI profile type

Publication

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full work available at URL

https://doi.org/10.1007/s00030-011-0142-1

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cites work

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Identifiers

zbMATH Open document ID

1257.35032

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Mathematics Subject Classification ID

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10.1007/S00030-011-0142-1

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Sitelinks

Mathematics(1 entry)

mardi Publication:1928843