Pythagorean Nanogeneralized Closed Sets with Application in Decision-Making | Zendy

D. Ajay | Zendy; J. Joseline Charisma | Zendy; T. Petaratip | Zendy; P. Hammachukiattikul | Zendy; N. Boonsatit | Zendy; Jihad Younis | Zendy; Grienggrai Rajchakit | Zendy

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Pythagorean Nanogeneralized Closed Sets with Application in Decision-Making

Author(s) -

D. Ajay,

J. Joseline Charisma,

T. Petaratip,

P. Hammachukiattikul,

N. Boonsatit,

Jihad Younis,

Grienggrai Rajchakit

Publication year - 2021

Publication title -

journal of function spaces

Language(s) - English

Resource type - Journals

eISSN - 2314-8896

pISSN - 2314-8888

DOI - 10.1155/2021/2571301

Subject(s) - pythagorean theorem , pythagorean triple , closed set , tearing , topology (electrical circuits) , set (abstract data type) , mathematics , computer science , algebra over a field , pure mathematics , geometry , combinatorics , engineering , mechanical engineering , programming language

Topology is studying the objects which are considered to be equal if they may also be continually deformed through other shapes as bending and twisting without tearing or glueing them. Topology is similar in geometrical structures and quantitatively equivalent. Nanotopology is the study of set. The main goal of this article is to propose the idea of generalized closed sets in Pythagorean nanotopological spaces. In addition, the concept of semigeneralized closed sets is also defined, and their properties are investigated. An application to MADM using Pythagorean nanotopology has been proposed and illustrated using a numerical example.

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