On a problem related to "second" best approximations to a real number

Abstract

For a given irrational number α one can define an irrationality measure function α[2](t) = (q, p) q, p ∈Z, 1≤slant q≤slant t, \\ (p, q) ≠ (pn, qn) ~∀ n∈Z+ |qα -p|, related to the second-best approximations to α. In 2017 Moshchevitin studied the corresponding Diophantine constant k(α) = t∞ t ·α[2](t) and the corresponding spectrum L2 = \ λ ~| ~∃α∈R Q λ = k(α) \. In particular, he calculated two largest elements of the spectrum L2. In the present paper we calculate the value for the third element of the spectrum L2.