Simultaneous approximations of some transcendental numbers (Q1814633)

Using Gelfond's method the author proves a quantitative refinement of a result of Brownawell and Waldschmidt considering the values of the exponential function. Let \(L\) be an algebraic number field, and let \(\Theta\) denote a transcendental number. Further, let \(\kappa_ 1,\kappa_ 2\in\mathbb{C}\), as well as \(\gamma_ 1,\gamma_ 2\in\mathbb{C}\), be linearly independent over \(\mathbb{Q}\), and suppose that \(\kappa_ 1,\kappa_ 2\) have a measure of linear independence \(| k_ 1\kappa_ 1 +k_ 2\kappa_ 2| >e^{-\tau k}\), \(k=| k_ 1|+| k_ 2|>0\), with a positive constant \(\tau\) for all \(k_ 1,k_ 2\in\mathbb{Z}\), and \(e^{\kappa_ 1 \gamma_ 1}, e^{\kappa_ 1 \gamma_ 2}\in L\). Under these assumptions a bound for the simultaneous approximation of the numbers \[ \kappa_ 1, \kappa_ 2, \gamma_ 1, \gamma_ 2, e^{\kappa_ 2\gamma_ 1}, e^{\kappa_ 2 \gamma_ 2} \] by the elements of \(L(\Theta)\) is given.