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- Olsson, Marianne,1973-Mittuniversitetet,Institutionen för teknik och hållbar utveckling (-2013) (author)
G-Convergence and Homogenization of some Monotone Operators
- BookEnglish2008
Publisher, publication year, extent ...
- Östersund :Mid Sweden Univ,2008
- 141 s.
- electronicrdacarrier
Numbers
- LIBRIS-ID:oai:DiVA.org:miun-94
- ISBN:9789185317851
- https://urn.kb.se/resolve?urn=urn:nbn:se:miun:diva-94URI
Supplementary language notes
- Language:English
- Summary in:English
Part of subdatabase
- SwePubSwePub
Classification
Series
- Mid Sweden University doctoral thesis,1652-893X ;45
Notes
- In this thesis we investigate some partial differential equations with respect to G-convergence and homogenization. We study a few monotone parabolic equations that contain periodic oscillations on several scales, and also some linear elliptic and parabolic problems where there are no periodicity assumptions. To begin with, we examine parabolic equations with multiple scales regarding the existence and uniqueness of the solution, in view of the properties of some monotone operators. We then consider G-convergence for elliptic and parabolic operators and recall some results that guarantee the existence of a well-posed limit problem. Then we proceed with some classical homogenization techniques that allow an explicit characterization of the limit operator in periodic cases. In this context, we prove G-convergence and homogenization results for a monotone parabolic problem with oscillations on two scales in the space variable. Then we consider two-scale convergence and the homogenization method based on this notion, and also its generalization to multiple scales. This is further extended to the case that allows oscillations in space as well as in time. We prove homogenization results for a monotone parabolic problem with oscillations on two spatial scales and one temporal scale, and for a linear parabolic problem where oscillations occur on one scale in space and two scales in time. Finally, we study some linear elliptic and parabolic problems where no periodicity assumptions are made and where the coefficients are created by certain integral operators. Here we prove results concerning when the G-limit may be obtained immediately and is equal to a certain weak limit of the sequence of coefficients.
Subject headings and genre
- NATURVETENSKAP Matematik hsv//swe
- NATURAL SCIENCES Mathematics hsv//eng
- G-convergence
- homogenization
- two-scale convergence
- MATHEMATICS
- MATEMATIK
Added entries (persons, corporate bodies, meetings, titles ...)
- Holmbom, AndersMittuniversitetet,Institutionen för teknik, fysik och matematik (-2008) (thesis advisor)
- Svanstedt, Nils (thesis advisor)
- Gulliksson, MårtenMittuniversitetet,Institutionen för teknik, fysik och matematik (-2008) (thesis advisor)
- Françu, Jan,ProfessorDept. of Mathematical Analysis (opponent)
- MittuniversitetetInstitutionen för teknik och hållbar utveckling (-2013) (creator_code:org_t)
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