Equidistribution in the space of 3-lattices and Dirichlet-improvable vectors on planar lines
Abstract
Let X=SL3(R)/SL3(Z), and gt=diag(e2t, e-t, e-t). Let denote the push-forward of the normalized Lebesgue measure on a segment of a straight line in the expanding horosphere of \gt\t>0, under the map h hSL3(Z) from SL3(R) to X. We give explicit necessary and sufficient Diophantine conditions on the line for equidistribution of each of the following families of measures on X: (1) gt-translates of as t∞. (2) averages of gt-translates of over t∈[0,T] as T∞. (3) gti-translates of for some ti∞. We apply this dynamical result to show that Lebesgue-almost every point on the planar line y=ax+b is not Dirichlet-improvable if and only if (a,b)2.
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