This paper presents in the thirteenth improved and extended edition a deeper understanding of the quantification of mathematical infinity by introducing mid-finite numbers. Concept of cardinality as well as concepts of open and closed sets are overcome, and...
More
This paper presents in the thirteenth improved and extended edition a deeper understanding of the quantification of mathematical infinity by introducing mid-finite numbers. Concept of cardinality as well as concepts of open and closed sets are overcome, and the measure problem is solved. The number of algebraic numbers is determined. The (generalised) Riemann hypothesis is disproved, Goldbach's strong conjecture and the ones by Beal resp. Catalan are proved. Intex and DFT method yield fast algorithms for solving inequalities resp. differential equations. The tightened prime number theorem and the equality of the complexity classes P and NP are elementarily proved.
Less
