Theorem: Any number can be dissected and then restored to its original state (Second Postulate of Ternary Mathematics).
The proof of number decomposition and isomorphism of integers to the field of vectors is presented in the following article [1].
In the future, we hope to apply this idea to a variety of number types and use Ternary Maths to demonstrate the isomorphism of any given number.
"Comments on Ternary Mathematics and 3D Placement of Logical Elements Justification Further Research" is a look at how numbers work inside any selected system of counting, as well as an analysis of the previously released paper. In this regard, its information may be of interest to computer scientists, mathematicians, and other professionals who work with numerical systems.
The article is divided into three sections:
1. In the introduction, we mention a previously established Ternary Mathematics principle.
2. The Results and Discussion section, which essentially replicates the matrix decomposition stated in "Ternary Mathematics and 3D Placement of Logical Elements Justification,"
3. A overview of the progress made thus far in developing Ternary Mathematics and its concepts in order to adapt them to the needs of Applied Mathematics and Computer Science is provided in the conclusion.Author(S) Details
Ruslan Pozinkevych
Faculty of Informations Technologies and Mathematics, The Eastern European National University, 43021, Lutsk, Potapov str.9, Ukraine.
View Book:- https://stm.bookpi.org/RAMRCS-V3/article/view/4471
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