(0.86; 0.12; 0.54) ∧
𝑁
(0.18; 0.44; 0.72)∧
𝑁
(0.90; 0.05; 0.05)∧
𝑁
(0.09; 0.14; 0.82)
∧
𝑁
(0.82, 0.09, 0.14) = (min{0.86, 0.18, 0.90, 0.09, 0.82}, max {0.12, 0.44, 0,05, 0.14, 0.09},
max {0.54, 0.72, 0.05, 0.82, 0.14}) = (0.09, 0.44, 0.82),
¡o Juan ama, no está seguro (indeterminado) y no le gusta su ciudad con un grado neutrosófico acumulativo
del 9%, 44% y 82% respectivamente!
6 INVESTIGACIONES FUTURAS
Construir los operadores de agregación plitogénica (tales como: intersección, unión, negación, implicación,
etc.) de las variables V
1
, V
2
,…, V
n
en conjunto (agregación acumulada), en los casos en que las variables V
i
y V
j
tengan algún grado de dependencia dijy grado de independencia 1- dij, con dij∈[0, 1], para todo i, j ∈ {1, 2,…,
n} y n ≥2.
CONCLUSIONES
Demostramos en este artículo que la lógica plitogénica es la lógica más grande posible de la actualidad. Da-
do que vivimos en un mundo lleno de indeterminación y datos contradictorios, tenemos que lidiar, en lugar de
una verdad simple con una verdad compleja, donde esta última es una verdad acumulativa resultante de la agre-
gación plitogénica, de muchas variables aleatorias de valor de verdad que caracterizan un artículo (o evento).
Referencias
[1] Florentin Smarandache: Plithogeny, Plithogenic Set, Logic, Probability, and Statistics. Brussels, Belgium: Pons, 2017,
141 p.; http://fs.unm.edu/Plithogeny.pdf
[2] Florentin Smarandache: Plithogenic Set, an Extension of Crisp, Fuzzy, Intuitionistic Fuzzy, and Neutrosophic Sets -
Revisited. Neutrosophic Sets and Systems, Vol. 21, 2018, 153-166;
http://fs.unm.edu/NSS/PlithogenicSetAnExtensionOfCrisp.pdf
[3] Florentin Smarandache (Special Issue Editor): New types of Neutrosophic Set/Logic/Probability, Neutrosophic Over-
/Under-/Off-Set, Neutrosophic Refined Set, and their Extension to Plithogenic Set/Logic/Probability, with Applications.
Special Issue of Symmetry (Basel, Switzerland, in Scopus, IF: 1.256), November 2019, 714 p.,
https://www.mdpi.com/journal/symmetry/special_issues/Neutrosophic_Set_Logic_Probability
[4] Florentin Smarandache, Mohamed Abdel-Basset (editors): Optimization Theory Based on Neutrosophic and Plithogenic
Sets, ELSEVIER, Academic Press, 2020, 446 p.; https://www.elsevier.com/books/optimization-theory-based-on-
neutrosophic-and-plithogenic-sets/smarandache/978-0-12-819670-0
[5] Florentin Smarandache: Extension of Soft Set to Hypersoft Set, and then to Plithogenic Hypersoft Set. Neutrosophic
Sets and Systems, Vol. 22, 2018, 168-170; http://fs.unm.edu/NSS/ExtensionOfSoftSetToHypersoftSet.pdf
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intuicionistas y neutrosoficos revisitado. Neutrosophic Computing and Machine Learning, Vol. 3, 2018, 1-19.
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[9] Florentin Smarandache, Nivetha Martin: Plithogenic n-Super Hypergraph in Novel Multi-Attribute Decision Making.
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[10] Shazia Rana, Muhammad Saeed, Midha Qayyum, Florentin Smarandache: Plithogenic Subjective Hyper-Super-Soft
Matrices with New Definitions & Local, Global, Universal Subjective Ranking Model. International Journal of
Neutrosophic Science (IJNS) Vol. 6, No. 2, 2020, 56-79; DOI: 10.5281/zenodo.3841624.
[11] Firoz Ahmad, Ahmad Yusuf Adhami, Florentin Smarandache: Modified neutrosophic fuzzy optimization model for
optimal closed-loop supply chain management under uncertainty. Optimization Theory Based on Neutrosophic and
Plithogenic Sets, 2020, 343-403; DOI: 10.1016/B978-0-12-819670-0.00015-9.
[12] Sudipta Gayen, Florentin Smarandache, Sripati Jha, Manoranjan Kumar Singh, Said Broumi, Ranjan Kumar:
Introduction to Plithogenic Hypersoft Subgroup. Neutrosophic Sets and Systems, Vol. 33, 2020, 208-233.
[13] Nivetha Martin, Florentin Smarandache: Introduction to Combined Plithogenic Hypersoft Sets. Neutrosophic Sets and
Systems, Vol. 35, 2020, 503-510.
[14] Shio Gai Quek, Ganeshsree Selvachandran, Florentin Smarandache, J. Vimala, Son Hoang Le, Quang-Thinh Bui,
Vassilis C. Gerogiannis: Entropy Measures for Plithogenic Sets and Applications in Multi-Attribute Decision Making.
Mathematics 2020, 8, 965, 17 p.; DOI: 10.3390/math8060965.
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[16] George Bala: Information Fusion Using Plithogenic Set and Logic. Acta Scientific Computer Sciences 2.7, 2020, 26-27.
[17] Shawkat Alkhazaleh: Plithogenic Soft Set. Neutrosophic Sets and Systems, Vol. 33, 2020, 256-274.
[18] R. Sujatha, S. Poomagal, G. Kuppuswami, Said Broumi: An Analysis on Novel Corona Virus by a Plithogenic Fuzzy