Exponents for three-dimensional simultaneous Diophantine approximations

Abstract

Let = (θ1,θ2,θ3)∈ R3. Suppose that 1,θ1,θ2,θ3 are linearly independent over Z. For Diophantine exponents α() = \γ >0:\,\,\, t +∞ tγ (t) <+∞ \ , β() = \γ >0:\,\,\, t +∞ tγ (t) <+∞\ we prove β () 1/2 (α ()/1-α() +α()/1-α())2 +4α()/1-α()) α ()