Sökning: "marianne olsson"
Visar resultat 1 - 5 av 7 avhandlingar innehållade orden marianne olsson.
1. Reiterated homogenization and G-convergence for some sequences of monotone operators
Sammanfattning : In this thesis, the main focus is on G-convergence and homogenization of monotone parabolic equations with multiple scales. This kind of equation is examined with respect to existence and uniqueness of the solution, in view of the properties of some monotone operators. LÄS MER
2. G-Convergence and Homogenization of some Monotone Operators
Sammanfattning : 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. LÄS MER
3. Movement and experimentation in young children's learning : Deleuze and Guattari in early childhood education
Sammanfattning : This study departs from experiences made in a setting where preschool children, teachers, teacher students, teacher educators and researchers in the Stockholm area in Sweden have been collectively experimenting with subjectivity and learning since the beginning of the 1990’s. However, during later years, questions were raised in the context of cooperative work about the changes that have been achieved so far, possibly becoming new and somewhat rigid ‘mappings’ of young children and learning. LÄS MER
4. Further Investigations of Convergence Results for Homogenization Problems with Various Combinations of Scales
Sammanfattning : This thesis is based on six papers. We study the homogenization of selected parabolic problems with one or more microscopic scales in space and time, respectively. LÄS MER
5. Homogenization of Partial Differential Equations using Multiscale Convergence Methods
Sammanfattning : The focus of this thesis is the theory of periodic homogenization of partial differential equations and some applicable concepts of convergence. More precisely, we study parabolic problems exhibiting both spatial and temporal microscopic oscillations and a vanishing volumetric heat capacity type of coefficient. LÄS MER