Comments on Ternary Mathematics and 3D Placement of Logical Elements Justification Further Research

Abstract

Hypothesis: Any number can be decomposed and further on brought back to its original form (Second Postulate of Ternary Mathematics).

The following article presents the proof of number decomposition and isomorphism of Integers to the field of vectors [1].

In perspective we aim to adapt this principle to various number types and show the isomorphism of any given number using Ternary Maths conversion.

“Comments on Ternary Mathematics and 3D Placement of Logical Elements Justification Further Research” is not only an analysis of the previously published manuscript, it is also a look at how numbers function within any chosen system of counting In that respect its content might be interesting for Computer Scientists Mathematicians and all specialists working with numeric systems.

The article consists of 3 main parts:

1. An Introduction is where we mention an earlier discovered principle of a Ternary Mathematics
2. Results and Discussion part which basically repeats decomposition of the matrix process described in “Ternary Mathematics and 3D Placement of Logical Elements Justification"
3. Conclusion is a summary of all progress made thus far in developing of Ternary Mathematics and its principles to adjust them to the needs of Applied Maths and Computer Science