Geometric programming problem with single-term exponents subject to Max-product fuzzy relational equations
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Publication:534804
DOI10.1016/j.mcm.2010.07.018zbMath1211.90330OpenAlexW1994957463MaRDI QIDQ534804
Publication date: 10 May 2011
Published in: Mathematical and Computer Modelling (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.1016/j.mcm.2010.07.018
Fuzzy and other nonstochastic uncertainty mathematical programming (90C70) Fuzzy real analysis (26E50)
Related Items (11)
Maximizing a monomial geometric objective function subject to bipolar max-product fuzzy relation constraints ⋮ Solving nonlinear optimization problems with bipolar fuzzy relational equation constraints ⋮ Linear fractional multi-objective optimization problems subject to fuzzy relational equations with a continuous Archimedean triangular norm ⋮ A new algorithm for geometric optimization with a single-term exponent constrained by bipolar fuzzy relation equations ⋮ Random-term-absent addition-min fuzzy relation inequalities and their lexicographic minimum solutions ⋮ Unnamed Item ⋮ Geometric programming with discrete variables subject to max-product fuzzy relation constraints ⋮ Single-variable term semi-latticized fuzzy relation geometric programming with max-product operator ⋮ Posynomial geometric programming problem subject to max-min fuzzy relation equations ⋮ Geometric programming with a single-term exponent subject to bipolar max-product fuzzy relation equation constraints ⋮ Maximin optimization problem subject to min-product fuzzy relation inequalities with application in supply and demand scheme
Cites Work
- Unnamed Item
- Unnamed Item
- Minimizing a linear objective function with fuzzy relation equation constraints
- A note on fuzzy relation programming problems with max-strict-\(t\)-norm composition
- A survey on fuzzy relational equations. I: Classification and solvability
- Resolution of finite fuzzy relation equations
- Fuzzy relation equations theory as a basis of fuzzy modelling: An overview
- Design of fuzzy logic controllers based on generalized T-operators
- Solving a linear programming problem with the convex combination of the max-min and the Max-average fuzzy relation equations
- On the resolution and optimization of a system of fuzzy relational equations with sup-\(T\) composition
- Minimizing a linear fractional function subject to a system of sup-\(T\) equations with a continuous Archimedean triangular norm
- On generalized fuzzy relational equations and their applications
- Fuzzy relation equations on a finite set
- Latticized linear programming and fuzzy relation inequalities
- Solving fuzzy relation equations with a linear objective function
- Fuzzy relation equations. I: The general and specialized solving algorithms
- Multi-objective optimization problems with fuzzy relation equation constraints
- Minimizing a linear function under a fuzzy max-min relational equation constraint
- Theory of T-norms and fuzzy inference methods
- On the relation between equations with max-product composition and the covering problem
- Optimizing the geometric programming problem with single-term exponents subject to max-min fuzzy relational equation constraints
- Linear objective function optimization with fuzzy relation equation constraints regarding max--av composition
- An algorithm for optimizing the linear function with fuzzy relation equation constraints regarding max-prod composition
- Solution sets of interval-valued fuzzy relational equations
- Resolution of composite fuzzy relation equations
- A multi‐objective mathematical programming problem with fuzzy relation constraints
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