Non-archimedean analysis on the extended hyperreal line $^*R_d$ and the solution of some very old transcendence conjectures over the field $Q$

In this paper possible completion $^*R_{d}$ of the Robinson non-archimedean field $^*R$ constructed by Dedekind sections. Given an class of analytic functions of one complex variable $f in C[[z]]$,we investigate the arithmetic nature of the values of $f$ at transcendental points $e^{n}$. Main results are: 1) the both numbers $e+pi$ and $epi$ are irrational, 2) number $e^{e}$ is transcendental. Nontrivial generalization of the Lindemann-Weierstrass theorem is obtained