Random Geometric Systems
Termin:
04.05.2023
Fördergeber:
Deutsche Forschungsgemeinschaft (DFG)
In March 2019, the Senate of the Deutsche Forschungsgemeinschaft (DFG, German Research Foundation) established the Priority Programme "Random Geometric Systems" (SPP 2265). The programme is designed to run for six years. The present call invites proposals for the second (and last) three-year funding period.
Phenomena that emerge from an interaction between random influences and geometric properties are ubiquitous and extremely diverse. They appear in physics (e.g., condensation or crystallisation in interacting random particle models for equilibrium and non-equilibrium situations), materials science (e.g., electrical conducting properties in metals with impurities), in telecommunication (e.g., connectivity in spatial multi-hop ad-hoc communication networks), and elsewhere. The origins and the mechanisms that lead to the phenomena are often deeply hidden. Bringing them to the surface often requires serious research activities, many of which have to be theoretical by the nature of the problem.
This Priority Programme is devoted to the mathematical analysis of effects and phenomena that emerge from an interplay between randomness and geometry. Many questions of intrinsic mathematical interest will be studied. Disciplines like physics, materials science and telecommunication will be crucial sources of problems, applications, motivations, models and solutions. The main focus will lie on the development of new and the refinement of existing methods, and on the creation and analysis of new random spatial models. Approaches to render approximate theories in statistical physics more rigorous as well as the exploration of the mathematical foundations for physically relevant models will be highly welcome.
Goals comprise the rigorous description and analysis of emergence of macroscopic phenomena like condensation, percolation, crystallisation, vitrification; geometric functionals of random structures like Minkowski functionals and tensors, and cluster counts; new limiting geometries; geometric systems driven by correlated spatial randomness; metastability in spatial processes away from equilibrium; effects arising from kinetic or geometric constraints; new applied spatial random models. The Priority Programme is expected to push forward substantial developments into various timely directions, like time-dependent random media, continuous-space modelling, long-range dependence of interactions, description of entire geometries instead of characteristic quantities, or the introduction of spatiality into mean-field models.
The research of this Priority Programme will mostly evolve around the following main areas: random point processes, random fields, statistical physics, percolation in the continuum, random geometric graphs, energy-based random point configurations, dynamics in random media. Establishing cross-connections will be highly welcome. Stochastic homogenisation does not belong to the topics of this Priority Programme.
Analytical work shall be dominant in this Priority Programme. Important impulses and progress will also come from the field of mathematical statistics; mathematical work that leads to the development of statistical tools for the analysis of geometric data will be welcome to the Priority Programme. Furthermore, also numerical and modeling work as well as a systematic transfer of questions from the applied sciences into mathematics will substantially contribute to the success of the programme.
Proposals must be written in English and submitted to the DFG by 24 April 2023. Please note that proposals can only be submitted via elan, the DFG's electronic proposal processing system.
Further Information:
https://www.dfg.de/foerderung/info_wissenschaft/ausschreibungen/info_wissenschaft_22_96/index.html
Phenomena that emerge from an interaction between random influences and geometric properties are ubiquitous and extremely diverse. They appear in physics (e.g., condensation or crystallisation in interacting random particle models for equilibrium and non-equilibrium situations), materials science (e.g., electrical conducting properties in metals with impurities), in telecommunication (e.g., connectivity in spatial multi-hop ad-hoc communication networks), and elsewhere. The origins and the mechanisms that lead to the phenomena are often deeply hidden. Bringing them to the surface often requires serious research activities, many of which have to be theoretical by the nature of the problem.
This Priority Programme is devoted to the mathematical analysis of effects and phenomena that emerge from an interplay between randomness and geometry. Many questions of intrinsic mathematical interest will be studied. Disciplines like physics, materials science and telecommunication will be crucial sources of problems, applications, motivations, models and solutions. The main focus will lie on the development of new and the refinement of existing methods, and on the creation and analysis of new random spatial models. Approaches to render approximate theories in statistical physics more rigorous as well as the exploration of the mathematical foundations for physically relevant models will be highly welcome.
Goals comprise the rigorous description and analysis of emergence of macroscopic phenomena like condensation, percolation, crystallisation, vitrification; geometric functionals of random structures like Minkowski functionals and tensors, and cluster counts; new limiting geometries; geometric systems driven by correlated spatial randomness; metastability in spatial processes away from equilibrium; effects arising from kinetic or geometric constraints; new applied spatial random models. The Priority Programme is expected to push forward substantial developments into various timely directions, like time-dependent random media, continuous-space modelling, long-range dependence of interactions, description of entire geometries instead of characteristic quantities, or the introduction of spatiality into mean-field models.
The research of this Priority Programme will mostly evolve around the following main areas: random point processes, random fields, statistical physics, percolation in the continuum, random geometric graphs, energy-based random point configurations, dynamics in random media. Establishing cross-connections will be highly welcome. Stochastic homogenisation does not belong to the topics of this Priority Programme.
Analytical work shall be dominant in this Priority Programme. Important impulses and progress will also come from the field of mathematical statistics; mathematical work that leads to the development of statistical tools for the analysis of geometric data will be welcome to the Priority Programme. Furthermore, also numerical and modeling work as well as a systematic transfer of questions from the applied sciences into mathematics will substantially contribute to the success of the programme.
Proposals must be written in English and submitted to the DFG by 24 April 2023. Please note that proposals can only be submitted via elan, the DFG's electronic proposal processing system.
Further Information:
https://www.dfg.de/foerderung/info_wissenschaft/ausschreibungen/info_wissenschaft_22_96/index.html