Examples of badly approximable vectors over number fields
Abstract
We consider approximation of vectors z∈ Fr×Cs by elements of a number field F and construct examples of badly approximable vectors. These examples come from compact subspaces of SL2(OF) SL2(F) naturally associated to (totally indefinite, anisotropic) F-rational binary quadratic and Hermitian forms, a generalization of the well-known fact that quadratic irrationals are badly approximable over Q.
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