Tent property of the growth indicator functions and applications

Abstract

Let be a Zariski dense discrete subgroup of a connected semisimple real algebraic group G. Let k=rank G. Let :a R \-∞\ be the growth indicator function of , first introduced by Quint. In this paper, we obtain the following pointwise bound of : for all v∈ a, (v) 1 i k δαi αi(v) where =\α1, ·s, αk\ is the set of all simple roots of (g,a) and 0<δαi ∞ is the critical exponent of associated to αi. When is -Anosov, there are precisely k-number of directions where the equality is achieved, and the following strict inequality holds for k 2: for all v∈ a-\0\, (v) <1kΣi=1k δαi αi (v). We discuss applications for self-joinings of convex cocompact subgroups in Πi=1k SO(ni,1) and Hitchin subgroups of PSL(d, R). In particular, for a Zariski dense Hitchin subgroup <PSL(d, R), we obtain that for any v=diag(t1, ·s, td)∈ a+, (v) 1 i d-1 (ti -ti+1).

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