Pointwise equidistribution for one parameter diagonalizable group action on homogeneous space
Abstract
Let be a lattice of a semisimple Lie group L. Suppose that one parameter Ad-diagonalizable subgroup \gt\ of L acts ergodically on L/ with respect to the probability Haar measure μ. For certain proper subgroup U of the unstable horospherical subgroup of \gt\ we show that given x∈ L/ for almost every u∈ U the trajectory \gtux: 0 t T\ is uniformly distributed with respect to μ as T ∞.
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