论文信息 - Linear optimization with bipolar fuzzy relational equation constraints using the Łukasiewicz triangular norm

Linear optimization with bipolar fuzzy relational equation constraints using the Łukasiewicz triangular norm

This paper discusses the linear optimization problem constrained by a system of bipolar fuzzy relational equations with max-$$T$$T composition, where the involved triangular norm is the Łukasiewicz t-norm. Although it is in general NP-hard, such an optimization problem can be reformulated in polynomial time into a 0-1 integer linear optimization problem and then solved taking advantage of well developed techniques in integer optimization.

Yuhan Liu | Pingke Li

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