Lipschitz simplicial volume of connected sums
- Prelegent(ci)
- Karol Strzałkowski
- Afiliacja
- IMPAN
- Termin
- 14 marca 2016 14:30
- Pokój
- p. 4070
- Seminarium
- Seminarium „Topologia algebraiczna”
Abstract: The simplicial
voume is a homotopy invariant of manifolds, intruduced by Gromov in his
proof of the Mostov rigidity theorem. However, it has applications to
many other areas, such as degree theorems, knot theory and traversing
vector fields. The Lipschitz simplicial
volume is a metric version of this invariant, more suitable in the
study of non-compact manifolds. One of the well known properties of the simplicial
volume (also in the non-compact case) is its additivity with respect to
connected sums in dim>2, and more generally with respect to gluings
along amenable submanifolds. However, the proof does not generalise to
the Lipschitz case. In this talk I will present a sketch of the proof of the additividy of the Lipschitz simplicial volume with respect to connected sums and gluings along amenable submanifolds with some additionalasphericity conditions.