Cogrowth for group actions with strongly contracting elements

Abstract: Let G be a group acting properly by isometries and with a strongly contracting element on a geodesic metric space. Let N be an infinite normal subgroup of G, and let δ N and δ G be the growth rates of N and G with respect to the pseudo-metric induced by the action. We prove that if G has purely exponential growth with respect to the pseudo-metric then δ N /δ G > 1/2. Our result applies to suitable actions of hyperbolic groups, right-angled Artin groups and other CAT(0) groups, mapping class groups, snowflake g… Show more

“…Proposition 4.28 (Eymard [19,Exposé 1,§2]). Let H be a subgroup of G such that H is co-amenable in G. Let V be a locally convex, topological vector space, endowed with a continuous affine action of G. Let K be a G-invariant, compact, convex subset of V .…”

“…Some of our results refine existing statements in the literature. In particular, we answer most of the questions raised by Arzhantseva and Cashen in [2]. Our main contribution though is the method that we use: we extend to this context the construction of Patterson-Sullivan measures (see below).…”

“…is bounded from above and away from zero [2]. Note that even if X is Gromov hyperbolic, there are groups G acting on X, which are divergent but do not have pure exponential growth.…”

“…In the past years, growth problems in groups with a contracting element have been investigated by various people, see for instance [46,1,17,47,48,2,29].…”

Patterson-Sullivan theory for groups with a strongly contracting element

“…Proposition 4.28 (Eymard [19,Exposé 1,§2]). Let H be a subgroup of G such that H is co-amenable in G. Let V be a locally convex, topological vector space, endowed with a continuous affine action of G. Let K be a G-invariant, compact, convex subset of V .…”

“…Some of our results refine existing statements in the literature. In particular, we answer most of the questions raised by Arzhantseva and Cashen in [2]. Our main contribution though is the method that we use: we extend to this context the construction of Patterson-Sullivan measures (see below).…”

“…is bounded from above and away from zero [2]. Note that even if X is Gromov hyperbolic, there are groups G acting on X, which are divergent but do not have pure exponential growth.…”

“…In the past years, growth problems in groups with a contracting element have been investigated by various people, see for instance [46,1,17,47,48,2,29].…”

Patterson-Sullivan theory for groups with a strongly contracting element

“…This was later generalized by Matsuzaki-Yabuki-Jaerisch [MYJ15] to deal with normal subgroups of discrete isometry groups of proper Gromov hyperbolic spaces. Arzhantseva and Cashen [AC18] have recently generalized [MYJ15] to normal subgroups of finitely generated groups acting on proper geodesic spaces with a strongly contracting element. This class includes rank-one actions on CAT(0) spaces as well as the mapping class group action on the Teichmüller space equipped with the Teichmüller metric.…”

Critical exponents of invariant random subgroups in negative curvature

Patterson–Sullivan theory for groups with a strongly contracting element