FAANon TERMINATED
A functional analytic approach for the analysis of nonlinear transmission problems
Total Cost €
0EC-Contrib. €
0Partnership
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0FAANon project word cloud
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Project "FAANon" data sheet
The following table provides information about the project.
| Coordinator |
ABERYSTWYTH UNIVERSITY
Organization address contact info |
| Coordinator Country | United Kingdom [UK] |
| Project website | http://fp7.imaps.aber.ac.uk/faanon.html |
| Total cost | 195˙454 € |
| EC max contribution | 195˙454 € (100%) |
| Programme |
1. H2020-EU.1.3.2. (Nurturing excellence by means of cross-border and cross-sector mobility) |
| Code Call | H2020-MSCA-IF-2014 |
| Funding Scheme | MSCA-IF-EF-ST |
| Starting year | 2015 |
| Duration (year-month-day) | from 2015-12-01 to 2017-11-30 |
Partnership
Take a look of project's partnership.
| # | ||||
|---|---|---|---|---|
| 1 | ABERYSTWYTH UNIVERSITY | UK (ABERYSTWYTH) | coordinator | 195˙454.00 |
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Project objective
The purpose of the research plan is the development of the method called Functional Analytical Approach (FAA) for the analysis of singular perturbations of nonlinear transmission problems. The techniques proposed are based on potential theory and functional analysis and aim at describing the effect of perturbations in terms of real analytic functions. Both perturbations of the shapes of the domains of definition and of the coefficients of the operators will be considered. A special attention will be paid to the case of perforated and periodically perforated domains with shrinking holes and inclusions. The problems addressed are of interest also in view of inter-sectorial applications to the analysis of physical models in fluid dynamic, in elasticity, and in thermodynamic. Concrete applications will be shown in the study effective properties of composite materials, in inverse problems in acoustic and electromagnetic scattering, and in inclusion detection problems. The results obtained represent a novelty with respect to the existing literature for the following reasons:
• the techniques of FAA are innovative with respect to the classical approaches existing in literature and allow the implementation of analytic functions in the description of the effect of perturbations;
• we treat non-linear boundary value problems and transmission problems, which are relevant in application and present challenging difficulties;
• we will obtain new results of pure mathematics in the frame of potential theory. In particular we will study the analyticity of certain nonlinear integral operators related to the layer and volume potentials;
• we will show how to obtain explicit calculations and we will show concrete applications in continuum mechanics.
The final goal within the action is the realisation of a complete theory based on the FAA which will represent in future a key tool for the analysis of perturbed boundary value problems.
Publications
| year | authors and title | journal | last update |
|---|---|---|---|
| 2017 |
M. Dalla Riva, P. Musolino The Dirichlet problem in a planar domain with two moderately close holes published pages: , ISSN: 0022-0396, DOI: 10.1016/j.jde.2017.04.006 |
Journal of Differential Equations | 2019-06-13 |
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