Set Theory and Logic


Non-Archimedean Analysis on the Extended Hyperreal Line ∗R_d and the Solution of Some Very Old Transcendence Conjectures Over the Field Q.

Authors: Jaykov Foukzon

In 1980 F. Wattenberg constructed the Dedekind completion∗d of the Robinson non-archimedean field ∗ and established basic algebraic properties of ∗d [6]. In 1985 H. Gonshor established further fundamental properties of ∗d [7].In [4] important construction of summation of countable sequence of Wattenberg numbers was proposed and corresponding basic properties of such summation were considered. In this paper the important applications of the Dedekind completion∗d in transcendental number theory were considered. We dealing using set theory ZFC  ∃(-model of ZFC).Given an class of analytic functions of one complex variable f ∈ z, we investigate the arithmetic nature of the values of fz at transcendental points en,n ∈ ℕ. Main results are: (i) the both numbers e   and e   are irrational, (ii) number ee is transcendental. Nontrivial generalization of the Lindemann- Weierstrass theorem is obtained.

Comments: 84 Pages.

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Submission history

[v1] 2015-06-18 15:52:27
[v2] 2015-07-08 13:53:53
[v3] 2015-07-19 07:43:00
[v4] 2015-11-28 01:02:00
[v5] 2016-02-08 00:58:31
[v6] 2016-02-19 13:37:03
[v7] 2016-03-05 13:46:48
[v8] 2016-04-30 08:12:21
[v9] 2016-05-14 14:11:23
[vA] 2017-02-15 03:38:49

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