Equidistribution of expanding measures with local maximal dimension and Diophantine Approximation
classification
🧮 math.DS
math.NT
keywords
dimensiondirichletlocalmaximalsubsettheoremalmostapproximation
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We consider improvements of Dirichlet's Theorem on space of matrices $M_{m,n}(R)$. It is shown that for a certain class of fractals $K\subset [0,1]^{mn}\subset M_{m,n}(R)$ of local maximal dimension Dirichlet's Theorem cannot be improved almost everywhere. This is shown using entropy and dynamics on homogeneous spaces of Lie groups.
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