The general goal of the project is to study Lie groups equipped with arbitrary distance functions and to develop an adapted geometric measure theory in the non-Riemannian settings.

The main focus is subRiemannian geometry, together with implications to control systems and nilpotent groups. SubRiemannian spaces, and especially Carnot groups, appear in various areas of mathematics, such as control theory, harmonic and complex analysis, subelliptic PDE's and geometric group theory.

The members of the team master methods coming from geometric measure theory, geometric analysis, and group theory; in particular, analysis on metric spaces and Lie group theory.

The main focus is subRiemannian geometry, together with implications to control systems and nilpotent groups. SubRiemannian spaces, and especially Carnot groups, appear in various areas of mathematics, such as control theory, harmonic and complex analysis, subelliptic PDE's and geometric group theory.

The members of the team master methods coming from geometric measure theory, geometric analysis, and group theory; in particular, analysis on metric spaces and Lie group theory.

| Grant Agreement | University of Jyvskäylä Press Release |

Enrico Le Donne

| Personal website |

Thibaut Dumont

Francesca Tripaldi

Fares Essebei

Valerio Gianella

Eero Hakavuori

Ville Kivioja

Terhi Moisala

Sebastiano Nicolussi Golo

The Jyväskylä Geometry seminar is on Mondays afternoons

in the Department of Mathematics and Statistics.

The meeting is usually from 14:15 to 16:00 in room MaD 380.

Please, check in advance the calendar below.

25/September/2017 | Higher rank hyperbolicity in spaces of non-positive curvature |

(MaD 380) | Urs Lang (ETH) The large scale geometry of Gromov hyperbolic metric spaces exhibits many distinctive features, such as the stability of quasi-geodesics (the Morse Lemma), the linear isoperimetric filling inequality for 1-cycles, the visibility property, and the homeomorphism between visual boundaries induced by a quasi-isometry. After briefly reviewing these properties, I will describe a number of closely analogous results for spaces of rank n > 1 in an asymptotic sense, under some weak assumptions reminiscent of non-positive curvature. A central role is played by a suitable notion of n-dimensional quasi-minimizing surfaces of polynomial growth of order n, which serve as a substitute for quasi-geodesics. |

9/October/2017 | TBA |

(MaD 380) | TBA (TBA) |

16/October/2017 | TBA |

(MaD 380) | Moritz Gruber (Karlsruhe Institute of Technology) |

23/October/2017 | TBA |

(MaD 380) | TBA (TBA) |

15/January/2018 | TBA |

(MaD 380) | TBA (TBA) |

22/January/2018 | TBA |

(MaD 380) | TBA (TBA) |

See all current Seminars | Past Seminars (archive) | Analysis Seminar |

Soon preprints related to ERC GeoMeG will be available in this space.

Information about Workshop and Conferences

related to the ERC GeoMeG project will be posted soon.

Plaese, contact the PI if you are interested to do a Ph.D. or a postdoc

in the framework of GeoMeG ERC project.

New positions will be open in the next years.

Prof. Enrico Le Donne