Your search keyword '"Schweizer-Sklar operations"' showing total 4 results

1. MADM Based on Generalized Interval Neutrosophic Schweizer-Sklar Prioritized Aggregation Operators

Author

Qaisar Khan, Lazim Abdullah, Tahir Mahmood, Muhammad Naeem, and Saima Rashid

Subjects

interval neutrosophic sets, Schweizer-Sklar operations, prioritized aggregation operator, decision making, Mathematics, QA1-939

Abstract

The interval neutrosophic set (INS) can make it easier to articulate incomplete, indeterminate, and inconsistent information, and the Schweizer-Sklar (Sh-Sk) t-norm (tm) and t-conorm (tcm) can make the information aggregation process more flexible due to a variable parameter. To take full advantage of INS and Sh-Sk operations, in this article, we expanded the Sh-Sk and to IN numbers (INNs) in which the variable parameter takes values from , develop the Sh-Sk operational laws for INNs and discussed its desirable properties. After that, based on these newly developed operational laws, two types of generalized prioritized aggregation operators are established, the generalized IN Sh-Sk prioritized weighted averaging (INSh-SkPWA) operator and the generalized IN Sh-Sk prioritized weighted geometric (INSh-SkPWG) operator. Additionally, we swot a number of valuable characteristics of these intended aggregation operators (AGOs) and created two novel decision-making models to match with multiple-attribute decision-making (MADM) problems under IN information established on INSh-SkPWA and INSh-SkPRWG operators. Finally, an expressive example regarding evaluating the technological innovation capability for the high-tech enterprises is specified to confirm the efficacy of the intended models.

Published

2019

2. Multi-Criteria Decision-Making Method Based on Single-Valued Neutrosophic Schweizer–Sklar Muirhead Mean Aggregation Operators

Author

Huanying Zhang, Fei Wang, and Yushui Geng

Subjects

Schweizer–Sklar operations, single-valued neutrosophic set, Muirhead mean operator, MCDM, Mathematics, QA1-939

Abstract

Schweizer⁻Sklar (SS) operation can make information aggregation more flexible, and the Muirhead mean (MM) operator can take into account the correlation between inputs by a variable parameter. Because traditional MM is only available for real numbers and single-valued neutrosophic set (SVNS) can better express incomplete and uncertain information in decision systems, in this paper, we applied MM operators to single-valued neutrosophic sets (SVNSs) and presented two new MM aggregation operators with the SS operation, i.e., a single-valued neutrosophic SS Muirhead mean (SVNSSMM) operator and a weighted single-valued neutrosophic SS MM (WSVNSSMM) operator. We listed some properties of them and some particular cases about various parameter values. We also proposed the multi-criteria decision-making method based on the WSVNSSMM operator in SVNS. At last, we illustrated the feasibility of this method using a numerical example of company investment.

Published

2019

3. MADM Based on Generalized Interval Neutrosophic Schweizer-Sklar Prioritized Aggregation Operators

Author

Lazim Abdullah, Tahir Mahmood, Saima Rashid, Muhammad Naeem, and Qaisar Khan

Subjects

0209 industrial biotechnology, Mathematical optimization, Physics and Astronomy (miscellaneous), Computer science, Process (engineering), lcsh:Mathematics, General Mathematics, prioritized aggregation operator, 02 engineering and technology, Interval (mathematics), lcsh:QA1-939, decision making, Operational laws, interval neutrosophic sets, Variable (computer science), 020901 industrial engineering & automation, Operator (computer programming), Schweizer-Sklar operations, Chemistry (miscellaneous), Information aggregation, 0202 electrical engineering, electronic engineering, information engineering, Computer Science (miscellaneous), 020201 artificial intelligence & image processing, Indeterminate, SWOT analysis

Abstract

The interval neutrosophic set (INS) can make it easier to articulate incomplete, indeterminate, and inconsistent information, and the Schweizer-Sklar (Sh-Sk) t-norm (tm) and t-conorm (tcm) can make the information aggregation process more flexible due to a variable parameter. To take full advantage of INS and Sh-Sk operations, in this article, we expanded the Sh-Sk and to IN numbers (INNs) in which the variable parameter takes values from [ ∞ − , 0 ) , develop the Sh-Sk operational laws for INNs and discussed its desirable properties. After that, based on these newly developed operational laws, two types of generalized prioritized aggregation operators are established, the generalized IN Sh-Sk prioritized weighted averaging (INSh-SkPWA) operator and the generalized IN Sh-Sk prioritized weighted geometric (INSh-SkPWG) operator. Additionally, we swot a number of valuable characteristics of these intended aggregation operators (AGOs) and created two novel decision-making models to match with multiple-attribute decision-making (MADM) problems under IN information established on INSh-SkPWA and INSh-SkPRWG operators. Finally, an expressive example regarding evaluating the technological innovation capability for the high-tech enterprises is specified to confirm the efficacy of the intended models.

Published

2019

4. Multi-Criteria Decision-Making Method Based on Single-Valued Neutrosophic Schweizer–Sklar Muirhead Mean Aggregation Operators

Author

Yushui Geng, Fei Wang, and Huanying Zhang

Subjects

0209 industrial biotechnology, Physics and Astronomy (miscellaneous), lcsh:Mathematics, General Mathematics, Neutrosophic set, 02 engineering and technology, lcsh:QA1-939, Multiple-criteria decision analysis, Multi criteria decision, Algebra, 020901 industrial engineering & automation, Operator (computer programming), single-valued neutrosophic set, Chemistry (miscellaneous), Decision system, Schweizer–Sklar operations, Information aggregation, 0202 electrical engineering, electronic engineering, information engineering, Computer Science (miscellaneous), 020201 artificial intelligence & image processing, Muirhead mean operator, MCDM, Real number, Mathematics, Variable (mathematics)

Abstract

Schweizer&ndash, Sklar (SS) operation can make information aggregation more flexible, and the Muirhead mean (MM) operator can take into account the correlation between inputs by a variable parameter. Because traditional MM is only available for real numbers and single-valued neutrosophic set (SVNS) can better express incomplete and uncertain information in decision systems, in this paper, we applied MM operators to single-valued neutrosophic sets (SVNSs) and presented two new MM aggregation operators with the SS operation, i.e., a single-valued neutrosophic SS Muirhead mean (SVNSSMM) operator and a weighted single-valued neutrosophic SS MM (WSVNSSMM) operator. We listed some properties of them and some particular cases about various parameter values. We also proposed the multi-criteria decision-making method based on the WSVNSSMM operator in SVNS. At last, we illustrated the feasibility of this method using a numerical example of company investment.

Published

2019