"Generalized Löb’s Theorem. Strong Reflection Principles and Large Cardinal Axioms"
written by J. Foukzon, E. R. Men’kova,
published by Advances in Pure Mathematics, Vol.3 No.3, 2013
has been cited by the following article(s):
  • Google Scholar
  • CrossRef
[1] Inconsistent countable set in second order ZFC
[2] Generalized Löb's Theorem. Strong Reflection Principles and Large Cardinal Axioms. Consistency Results in Topology and Homotopy Theory.
[3] Inconsistent countable set in second order ZFC and nonexistence of the strongly inaccessible cardinals. Non consistency results in topology.
[4] There Is No Standard Model of ZFC and ZFC2 with Henkin Semantics
2019
[5] There is No Standard Model of ZFC and ZFC2. Part II.
2019
[6] There is no standard model of ZFC
Journal of Global Research in Mathematical Archives (JGRMA), 2018
[7] There is No Standard Model of ZFC and ZFC2
2017
[8] Generalized lob's theorem. Strong reflection principles and large cardinal axioms. Consistency Results in Topology
2017
[9] Consistency results in topology and homotopy theory
2015
[10] Inconsistent countable set in second order ZFC and not existence of the strongly inaccessible cardinals.
2015
[11] Inconsistent Countable Set in Second Order ZFC and Nonexistence of the Strongly Inaccessible Cardinals
British Journal of Mathematics and Computer Science, 2015
[12] Generalized Löb's Theorem. Strong Reflection Principles and Large Cardinal Axioms. Consistency Results in Topology.
2015
[13] Strong Reflection Principles and Large Cardinal Axioms
2013
[14] Non-archimedean analysis on the extended hyperreal line $^* R_d $ and the solution of some very old transcendence conjectures over the field $ Q$
arXiv preprint arXiv:0907.0467, 2009
[15] Non-archimedean analysis on the extended hyperreal line and the solution of some very old transcendence conjectures over the field
2009