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Homogenization of p...
Homogenization of parabolic equations with an arbitrary number of scales in both space and time
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- Flodén, Liselott, 1967- (författare)
- Mittuniversitetet,Avdelningen för kvalitetsteknik, maskinteknik och matematik,Tillämpad matematik
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- Holmbom, Anders, 1958- (författare)
- Mittuniversitetet,Avdelningen för kvalitetsteknik, maskinteknik och matematik,Tillämpad matematik
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- Olsson Lindberg, Marianne, 1973- (författare)
- Mittuniversitetet,Avdelningen för kvalitetsteknik, maskinteknik och matematik,Tillämpad matematik
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- Persson, Jens, 1978- (författare)
- Mittuniversitetet,Avdelningen för kvalitetsteknik, maskinteknik och matematik,Tillämpad matematik
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(creator_code:org_t)
- Boston : Hindawi Publishing Corporation, 2014
- 2014
- Engelska.
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Ingår i: Journal of Applied Mathematics. - Boston : Hindawi Publishing Corporation. - 1110-757X .- 1687-0042. ; , s. Art. no. 101685-
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Abstract
Ämnesord
Stäng
- The main contribution of this paper is the homogenization of the linearparabolic equationtu (x, t) − ·axq1, ...,xqn,tr1, ...,trmu (x, t)= f(x, t)exhibiting an arbitrary finite number of both spatial and temporal scales.We briefly recall some fundamentals of multiscale convergence and providea characterization of multiscale limits for gradients in an evolution settingadapted to a quite general class of well-separated scales, which we nameby jointly well-separated scales (see Appendix for the proof). We proceedwith a weaker version of this concept called very weak multiscale convergence.We prove a compactness result with respect to this latter typefor jointly well-separated scales. This is a key result for performing thehomogenization of parabolic problems combining rapid spatial and temporaloscillations such as the problem above. Applying this compactnessresult together with a characterization of multiscale limits of sequences ofgradients we carry out the homogenization procedure, where we togetherwith the homogenized problem obtain n local problems, i.e. one for eachspatial microscale. To illustrate the use of the obtained result we apply itto a case with three spatial and three temporal scales with q1 = 1, q2 = 2and 0 < r1 < r2.MSC: 35B27; 35K10
Ämnesord
- NATURVETENSKAP -- Matematik (hsv//swe)
- NATURAL SCIENCES -- Mathematics (hsv//eng)
Nyckelord
- Multiscale convergence
- very weak multiascale convergence
- homogenization theory
- parabolic partial differential equations
- evolution
Publikations- och innehållstyp
- ref (ämneskategori)
- art (ämneskategori)
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