Different Forms of Triangular Neutrosophic Numbers, De-Neutrosophication Techniques, and their Applications
Avishek Chakraborty,
Sankar Prasad Mondal,
Ali Ahmadian,
Norazak Senu,
Shariful Alam,
Soheil Salahshour
Affiliations
Avishek Chakraborty
Department of Basic Science, Narula Institute of Technology, Agarpara, Kolkata 700109, India
Sankar Prasad Mondal
Department of Mathematics, Midnapore College (Autonomous), Midnapore, West Midnapore 721101, India
Ali Ahmadian
Laboratory of Computational Sciences and Mathematical Physics, Institute for Mathematical Research, University Putra Malaysia, Serdang 43400 UPM, Malaysia
Norazak Senu
Laboratory of Computational Sciences and Mathematical Physics, Institute for Mathematical Research, University Putra Malaysia, Serdang 43400 UPM, Malaysia
Shariful Alam
Young Researchers and Elite Club, Mobarakeh Branch, Islamic Azad University, Mobarakeh, Iran
Soheil Salahshour
Department of Mathematics, Indian Institute of Engineering Science and Technology, Shibpur, Howrah 711103, India
In this paper, we introduce the concept of neutrosophic number from different viewpoints. We define different types of linear and non-linear generalized triangular neutrosophic numbers which are very important for uncertainty theory. We introduced the de-neutrosophication concept for neutrosophic number for triangular neutrosophic numbers. This concept helps us to convert a neutrosophic number into a crisp number. The concepts are followed by two application, namely in imprecise project evaluation review technique and route selection problem.
