Equidistribution of expanding translates of curves in homogeneous spaces with the action of (SO(n,1))k
Abstract
Given a homogeneous space X = G/ with G containing the group H = (SO(n,1))k. Let x∈ X such that Hx is dense in X. Given an analytic curve φ: I=[a,b] → H, we will show that if φ satisfies certain geometric condition, then for a typical diagonal subgroup A =\a(t): t ∈ R\ ⊂ H the translates \a(t)φ(I)x: t >0\ of the curve φ(I)x will tend to be equidistributed in X as t → +∞. The proof is based on the study of linear representations of SO(n,1) and H.
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