Rational approximations to two irrational numbers
Abstract
For real we consider the irrationality measure function (t) = 1≤slant q ≤slant t, q∈Z || q ||, where ||·|| - distance to the nearest integer. We prove that in the case αβ there exist arbitrary large values of t with | 1α(t) - 1β(t) | ≥slant 5(1-5-12)t. The constant on the right-hand side is optimal.
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