An efficient solution strategy for bilevel multiobjective optimization problems using multiobjective evolutionary algorithm
From MaRDI portal
Publication:2100200
DOI10.1007/s00500-021-05750-0zbMath1498.90214OpenAlexW3145900040MaRDI QIDQ2100200
Publication date: 21 November 2022
Published in: Soft Computing (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.1007/s00500-021-05750-0
Pareto optimalitysmoothing techniquemultiobjective evolutionary algorithmweighted sum scalarizationbilevel multiobjective optimization
Uses Software
Cites Work
- An algorithm based on particle swarm optimization for multiobjective bilevel linear problems
- MOEA/D + uniform design: a new version of MOEA/D for optimization problems with many objectives
- Bilevel programming: a survey
- Multiobjective bilevel optimization
- Linear bilevel programs with multiple objectives at the upper level
- An exact penalty on bilevel programs with linear vector optimization lower level
- Evolutionary multi-criterion optimization. 5th international conference, EMO 2009, Nantes, France, April 7--10, 2009. Proceedings
- Stackelberg-Nash equilibrium for multilevel programming with multiple followers using genetic algorithms
- A smoothing method for mathematical programs with equilibrium constraints
- Practical bilevel optimization. Algorithms and applications
- Bilevel and multilevel programming: A bibliography review
- Differential evolution -- a simple and efficient heuristic for global optimization over continuous spaces
- Foundations of bilevel programming
- Multilevel decision-making: a survey
- A differential evolution with two mutation strategies and a selection based on an improved constraint-handling technique for bilevel programming problems
- A modification to MOEA/D-DE for multiobjective optimization problems with complicated Pareto sets
- Linear bilevel programming solution by genetic algorithm
- New optimality conditions for the semivectorial bilevel optimization problem
- Stackelberg solutions to multiobjective two-level linear programming problems
- Semivectorial bilevel optimization problem: penalty approach
- An overview of bilevel optimization
- An interactive approach based on a discrete differential evolution algorithm for a class of integer bilevel programming problems
- A New Evolutionary Algorithm for a Class of Nonlinear Bilevel Programming Problems and Its Global Convergence
- Necessary Optimality Conditions for Multiobjective Bilevel Programs
- Computing the Pareto frontier of a bi-objective bi-level linear problem using a multiobjective mixed-integer programming algorithm
- Annotated Bibliography on Bilevel Programming and Mathematical Programs with Equilibrium Constraints
This page was built for publication: An efficient solution strategy for bilevel multiobjective optimization problems using multiobjective evolutionary algorithm
