Constructing bounded orbits of special types on homogeneous spaces
Abstract
Let X = G/ be a quotient of a real Lie group by a non-uniform lattice. Consider a one-parameter subgroup F of G that is Ad-diagonalizable over C and whose action on (X,mX) is mixing. In this dynamical system we study the set of points x ∈ X with a precompact orbit, written as E(F,∞), which is known to be a dense subset of X of full Hausdorff dimension. We prove that E(F,∞) is indecomposable in the following sense: given any y ∈ E(F,∞), the set of x ∈ E(F,∞) for which y ∈ F+x, where F+ denotes the positive ray in F, is uncountable and dense in E(F,∞). When the dimension of the neutral subgroup of G with respect to F is 1 we demonstrate, for any >0, the existence of many points x ∈ X whose orbit closure F+x ⊂ X is compact and has Hausdorff dimension at least X - .
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