A new exponent of simultaneous rational approximation

Anthony Po\"els

arXiv:1803.11001·math.NT·June 13, 2019

A new exponent of simultaneous rational approximation

Anthony Po\"els

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Abstract

We introduce a new exponent of simultaneous rational approximation $λ_{m i n} (ξ, η)$ for pairs of real numbers $ξ, η$ , in complement to the classical exponents $λ (ξ, η)$ of best approximation, and $λ (ξ, η)$ of uniform approximation. It generalizes Fischler's exponent $β_{0} (ξ)$ in the sense that $λ_{m i n} (ξ, ξ^{2}) = 1/ β_{0} (ξ)$ whenever $λ (ξ, ξ^{2}) = 1$ . Using parametric geometry of numbers, we provide a complete description of the set of values taken by $(λ, λ_{m i n})$ at pairs $(ξ, η)$ with $1$ , $ξ$ , $η$ linearly independent over $Q$ .

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