Speaker:
Yves de Cornulier
Zugehörigkeit:
CNRS and Institut Camille Jordan, Université Lyon 1
Datum:
Mon, 08/07/2019 - 15:00 - 16:00
Introduced by Gromov in the nineties, the systolic growth of a
finitely generated group maps $n$ to the smallest index of a finite
index subgroup meeting the $n$-ball only in the identity singleton.
This function is one measure of residual finiteness. It extends to
compactly generated locally compact groups, replacing "finite index"
with "cocompact lattice" in the definition.
It grows as least as fast as the word growth, and with Bou-Rabee we
showed that the growth is exponential for linear groups of exponential
growth.