Jordan and Cartan spectra in higher rank with applications to correlations

Abstract

For a given d-tuple =(1,…,d): G of faithful Zariski dense convex cocompact representations of a finitely generated group , we study the correlations of length spectra \_i(γ)\[γ]∈[] and correlations of displacement spectra \d(i(γ)o,o)\γ∈. We prove that for any interior vector v=(v1,…,vd) in the spectrum cone, there exists δ( v) > 0 such that for any 1, …, d>0, there exist c1,c2> 0 such that align* &\#\[γ]∈ []: viT _i(γ) vi T+i, \;1 i d \ c1 eδ (v)T T(d+1)/2;\\ &\#\γ∈ : viT d(i(γ)o,o) vi T+i, \;1 i d \ c2 eδ ( v)T T(d-1)/2. align* We deduce this result as a special case of our main theorem on the distribution of Jordan projections with holonomies and Cartan projections in tubes of an Anosov subgroup of a semisimple real algebraic group G. We also show that the growth indicator of remains the same when we use Jordan projections instead of Cartan projections and tubes instead of cones, except possibly on the boundary of the limit cone.