Cel
Built on decades of deep research in ergodic theory, Szemeredi's regularity theory and statistical physics, a new subject is emerging whose goal is to study convergence and limits of various structures.
The main idea is to regard very large structures in combinatorics and algebra as approximations of infinite analytic objects. This viewpoint brings new tools from analysis and topology into these subjects. The success of this branch of mathematics has already been demonstrated through numerous applications in computer science, extremal combinatorics, probability theory and group theory. The present research plan addresses a number of open problems in additive combinatorics, ergodic theory, higher order Fourier analysis, extremal combinatorics and random graph theory. These subjects are all interrelated through the limit approach.
Dziedzina nauki
- natural sciencesmathematicspure mathematicsmathematical analysisfourier analysis
- natural sciencescomputer and information sciences
- natural sciencesmathematicspure mathematicsdiscrete mathematicsgraph theory
- natural sciencesmathematicspure mathematicsdiscrete mathematicscombinatorics
- natural sciencesmathematicsapplied mathematicsstatistics and probability
Zaproszenie do składania wniosków
ERC-2013-CoG
Zobacz inne projekty w ramach tego zaproszenia
System finansowania
ERC-CG - ERC Consolidator GrantsInstytucja przyjmująca
1053 Budapest
Węgry