Modified shrinking target problem for Matrix Transformations of Tori

Abstract

We calculate the Hausdorff dimension of the fractal set equation* \x∈ Td: Π1≤ i≤ d|Tβin(xi)-xi| < (n) for infinitely many n∈ N\, equation* where the Tβi is the standard βi-transformation with βi>1, is a positive function on N and |·| is the usual metric on the torus T. Moreover, we investigate a modified version of the shrinking target problem, which unifies the shrinking target problems and quantitative recurrence properties for matrix transformations of tori. Let T be a d× d non-singular matrix with real coefficients. Then, T determines a self-map of the d-dimensional torus Td:=Rd / Zd. For any 1≤ i ≤ d, let i be a positive function on N and (n):=(1(n),…, d(n)) with n∈ N. We obtain the Hausdorff dimension of the fractal set equation* \x∈ Td: Tn(x)∈ L(fn(x), (n)) for infinitely many n∈ N\, equation* where L(fn(x, (n))) is a hyperrectangle and \fn\n≥ 1 is a sequence of Lipschitz vector-valued functions on Td with a uniform Lipschitz constant.