Research Article
Year 2020,
Volume: 3 Issue: 3, 120 - 129, 29.12.2020
Abstract
References
- [1] J. C. Lagarias, The 3x+1 problem and its generalizations, Am. Math. Monthly, 92 (1985), 3-23.
- [2] J. C. Lagarias (Editor), The Ultimate Challenge: The 3x+1 Problem, American Mathematical Society, 2010.
- [3] Collatz conjecture, available at https://en.wikipedia.org/wiki/
- [4] T. Tao, Almost all orbits of the collatz map attain almost bounded values, (2019), arXiv:1909.03562v2 [math.PR].
- [5] J. C. Lagarias, The 3x+1 problem: An Annotated Bibliography, I (1963-1999), (2009), arXiv:math/0309224v12 [math.NT].
- [6] J. C. Lagarias, The 3x+1 problem: An Annotated Bibliography, II (2000-2009), (2009), arXiv:math/0608208v5 [math.NT].
- [7] R. Carbo-Dorca, Boolean hypercubes and the structure of vector spaces, J. Math. Sci. Modelling, 1 (2018), 1-14.
- [8] R. Carbo-Dorca, Natural vector spaces, (Inward power and Minkowski norm of a natural vector, natural Boolean hypercubes) and Fermat’s last theorem, J. Math. Chem., 55 (2017), 914-940.
- [9] R. Carbo-Dorca, C. Munoz-Caro, A. Ni˜no, S. Reyes, Refinement of a generalized Fermat’s last theorem conjecture in natural vector spaces, J. Math. Chem., 55 (2017), 1869-1877.
- [10] R. Carbo-Dorca, Cantor-like infinity sequences and Godel-like incompleteness revealed by means of Mersenne infinite dimensional Boolean hypercube concatenation, J. Math. Chem., 58 (2020), 1-5.
- [11] R. Carbo-Dorca, Fuzzy sets and Boolean tagged sets, J. Math. Chem., 22 (1997), 143-147.
- [12] R. Carbo, B. Calabuig, Molecular similarity and quantum chemistry, M. A. Johnson, G. M. Maggiora (editors) Chapter 6 in Concepts and Applications of Molecular Similarity, John Wiley & Sons Inc., New York, 1990, pp. 147-171.
- [13] R. Carbo, B. Calabuig, Molecular Quantum Similarity Measures and N-Dimensional Representation of Quantum Objects II. Practical Applications (3F-Propanol conformer taxonomy among other examples), Intl. J. Quant. Chem., 42 (1992), 1695-1709.
- [14] R. Carbo-Dorca, About Erd¨os discrepancy conjecture, J. Math. Chem., 54 (2016), 657-660.
- [15] R. Carbo-Dorca, N-dimensional Boolean hypercubes and the Goldbach conjecture, J. Math. Chem., 54 (2016), 1213-1220.
- [16] R. Carbo-Dorca, A study on Goldbach conjecture, J. Math. Chem., 54 (2016), 1798-1809.
- [17] R. Carbo-Dorca, Boolean hypercubes as time representation holders, J. Math. Chem., 56 (2018), 1349-1352.
- [18] R. Carbo-Dorca, DNA, unnatural base pairs and hypercubes, J. Math. Chem., 56 (2018), 1353-1356.
- [19] R. Carbo-Dorca, Transformation of Boolean hypercube vertices into unit interval elements: QSPR workout consequences, J. Math. Chem., 57 (2019), 694-696.
- [20] R. Carbo-Dorca, Role of the structure of Boolean hypercubes when used as vectors in natural (Boolean) vector semispaces, J. Math. Chem., 57 (2019), 697-700.
- [21] R. Carbo-Dorca, T. Chakraborty, Hypercubes defined on n-ary sets, the Erd¨os-Faber-Lov´asz conjecture on graph coloring, and the polypeptides and RNA description spaces, J. Math. Chem., 57 (2019), 2182-2194.
- [22] J. Chang, R. Carbo-Dorca, Fuzzy hypercubes and their time-like evolution, J. Math. Chem., 58 (2020), 1337–1344.
- [23] K. Balasubramanian, Combinatorial multinomial generators for colorings of 4D-hypercubes and their applications, J. Math. Chem., 56 (2018), 2707-2723.
- [24] K. Balasubramanian, Computational multinomial combinatorics for colorings of 5D-hypercubes for all irreducible representations and applications, J. Math. Chem., 57 (2018), 655-689.
- [25] https://www.mersenne.org/primes/
- [26] A.V. Kontorovich, J. C. Lagarias, Stochastic models for the 3x+1 and 5x+1 problems, (2009), arXiv:0910.1944v1 [math.NT].
- [27] http://www.ericr.nl/wondrous/
- [28] W. Ren A new approach on proving collatz conjecture, Hindawi J. Math., (2019), Article ID 6129836, 1-12.
Year 2020,
Volume: 3 Issue: 3, 120 - 129, 29.12.2020
Abstract
This study is based on the trivial transcription of the vertices of a Boolean \textit{N}-Dimensional Hypercube $\textbf{H}_{N} $ into a subset $\mathbb{S}_{N}$ of the decimal natural numbers $\mathbb{N}.$ Such straightforward mathematical manipulation permits to achieve a recursive construction of the whole set $\mathbb{N}.$ In this proposed scheme, the Mersenne numbers act as upper bounds of the iterative building of $\mathbb{S}_{N}$. The paper begins with a general description of the Collatz or $\left(3x+1\right)$ algorithm presented in the $\mathbb{S}_{N} \subset \mathbb{N}$ iterative environment. Application of a defined \textit{ad hoc} Collatz operator to the Boolean Hypercube recursive partition of $\mathbb{N}$, permits to find some hints of the behavior of natural numbers under the $\left(3x+1\right)$ algorithm, and finally to provide a scheme of the Collatz conjecture partial resolution by induction.
Keywords
Boolean Hypercubes Recursive Construction of Natural Numbers Mersenne Numbers Mersenne Twins Collatz Conjecture (3x+1) Conjecture Collatz Algorithm Collatz Operator
References
- [1] J. C. Lagarias, The 3x+1 problem and its generalizations, Am. Math. Monthly, 92 (1985), 3-23.
- [2] J. C. Lagarias (Editor), The Ultimate Challenge: The 3x+1 Problem, American Mathematical Society, 2010.
- [3] Collatz conjecture, available at https://en.wikipedia.org/wiki/
- [4] T. Tao, Almost all orbits of the collatz map attain almost bounded values, (2019), arXiv:1909.03562v2 [math.PR].
- [5] J. C. Lagarias, The 3x+1 problem: An Annotated Bibliography, I (1963-1999), (2009), arXiv:math/0309224v12 [math.NT].
- [6] J. C. Lagarias, The 3x+1 problem: An Annotated Bibliography, II (2000-2009), (2009), arXiv:math/0608208v5 [math.NT].
- [7] R. Carbo-Dorca, Boolean hypercubes and the structure of vector spaces, J. Math. Sci. Modelling, 1 (2018), 1-14.
- [8] R. Carbo-Dorca, Natural vector spaces, (Inward power and Minkowski norm of a natural vector, natural Boolean hypercubes) and Fermat’s last theorem, J. Math. Chem., 55 (2017), 914-940.
- [9] R. Carbo-Dorca, C. Munoz-Caro, A. Ni˜no, S. Reyes, Refinement of a generalized Fermat’s last theorem conjecture in natural vector spaces, J. Math. Chem., 55 (2017), 1869-1877.
- [10] R. Carbo-Dorca, Cantor-like infinity sequences and Godel-like incompleteness revealed by means of Mersenne infinite dimensional Boolean hypercube concatenation, J. Math. Chem., 58 (2020), 1-5.
- [11] R. Carbo-Dorca, Fuzzy sets and Boolean tagged sets, J. Math. Chem., 22 (1997), 143-147.
- [12] R. Carbo, B. Calabuig, Molecular similarity and quantum chemistry, M. A. Johnson, G. M. Maggiora (editors) Chapter 6 in Concepts and Applications of Molecular Similarity, John Wiley & Sons Inc., New York, 1990, pp. 147-171.
- [13] R. Carbo, B. Calabuig, Molecular Quantum Similarity Measures and N-Dimensional Representation of Quantum Objects II. Practical Applications (3F-Propanol conformer taxonomy among other examples), Intl. J. Quant. Chem., 42 (1992), 1695-1709.
- [14] R. Carbo-Dorca, About Erd¨os discrepancy conjecture, J. Math. Chem., 54 (2016), 657-660.
- [15] R. Carbo-Dorca, N-dimensional Boolean hypercubes and the Goldbach conjecture, J. Math. Chem., 54 (2016), 1213-1220.
- [16] R. Carbo-Dorca, A study on Goldbach conjecture, J. Math. Chem., 54 (2016), 1798-1809.
- [17] R. Carbo-Dorca, Boolean hypercubes as time representation holders, J. Math. Chem., 56 (2018), 1349-1352.
- [18] R. Carbo-Dorca, DNA, unnatural base pairs and hypercubes, J. Math. Chem., 56 (2018), 1353-1356.
- [19] R. Carbo-Dorca, Transformation of Boolean hypercube vertices into unit interval elements: QSPR workout consequences, J. Math. Chem., 57 (2019), 694-696.
- [20] R. Carbo-Dorca, Role of the structure of Boolean hypercubes when used as vectors in natural (Boolean) vector semispaces, J. Math. Chem., 57 (2019), 697-700.
- [21] R. Carbo-Dorca, T. Chakraborty, Hypercubes defined on n-ary sets, the Erd¨os-Faber-Lov´asz conjecture on graph coloring, and the polypeptides and RNA description spaces, J. Math. Chem., 57 (2019), 2182-2194.
- [22] J. Chang, R. Carbo-Dorca, Fuzzy hypercubes and their time-like evolution, J. Math. Chem., 58 (2020), 1337–1344.
- [23] K. Balasubramanian, Combinatorial multinomial generators for colorings of 4D-hypercubes and their applications, J. Math. Chem., 56 (2018), 2707-2723.
- [24] K. Balasubramanian, Computational multinomial combinatorics for colorings of 5D-hypercubes for all irreducible representations and applications, J. Math. Chem., 57 (2018), 655-689.
- [25] https://www.mersenne.org/primes/
- [26] A.V. Kontorovich, J. C. Lagarias, Stochastic models for the 3x+1 and 5x+1 problems, (2009), arXiv:0910.1944v1 [math.NT].
- [27] http://www.ericr.nl/wondrous/
- [28] W. Ren A new approach on proving collatz conjecture, Hindawi J. Math., (2019), Article ID 6129836, 1-12.
There are 28 citations in total.
Details
| Primary Language | English |
|---|---|
| Subjects | Mathematical Sciences |
| Journal Section | Articles |
| Authors | |
| Publication Date | December 29, 2020 |
| Submission Date | August 4, 2020 |
| Acceptance Date | December 18, 2020 |
| Published in Issue | Year 2020 Volume: 3 Issue: 3 |
Cite
Cited By
Extension of Fermat’s last theorem in Minkowski natural spaces
Journal of Mathematical Chemistry
https://doi.org/10.1007/s10910-021-01267-x
Boolean Hypercubes, Classification of Natural Numbers, and the Collatz Conjecture
Journal of Mathematical Sciences and Modelling
https://doi.org/10.33187/jmsm.972781
Journal of Mathematical Sciences and Modelling
The published articles in JMSM are licensed under a Creative Commons Attribution-NonCommercial 4.0 International License.