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Aarhus Universitets segl

On shrinking targets for Zm actions on tori

by Yann Bugeaud, Stephen Harrap, Simon Kristensen and Sanju Velani
Preprints Number 5 (December 2008)
Let A be an n×m matrix with real entries. Consider the set BadA of x[0,1)n for which there exists a constant c(x)>0 such that for any qZm the distance between x and the point {Aq} is at least c(x)|q|m/n. It is shown that the intersection of BadA with any suitably regular fractal set is of maximal Hausdorff dimension. The linear form systems investigated in this paper are natural extensions of irrational rotations of the circle. Even in the latter one-dimensional case, the results obtained are new.
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