On the interactive solution to a multicriteria scheduling problem
From MaRDI portal
Publication:3863679
DOI10.1007/BF01920271zbMath0426.90046OpenAlexW2085361808MaRDI QIDQ3863679
Reinhard Weber, O. Roglin, Rainer Rhode, Klaus Huckert
Publication date: 1980
Published in: Zeitschrift für Operations Research (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.1007/bf01920271
schedulinginteractive methodproject planningheuristic efficiencymixed integer multiple criteria modelTchebycheff-approximation
Mixed integer programming (90C11) Deterministic scheduling theory in operations research (90B35) Best approximation, Chebyshev systems (41A50)
Related Items (14)
Two machine open shop scheduling problems with bi-criteria ⋮ A multiobjective, multi-level heuristic for dynamic resource constrained scheduling problems ⋮ Multiple and bicriteria scheduling: A literature survey ⋮ Unnamed Item ⋮ Cultural-based genetic tabu algorithm for multiobjective job shop scheduling ⋮ A nonlinear mixed integer goal programming model for the two-machine closed flow shop ⋮ Single machine sequencing with nonlinear multicriteria cost functions: An application of generalized dynamic programming ⋮ Application of the ellipsoid method in an interactive procedure for multicriteria linear programming ⋮ Counting and enumeration complexity with application to multicriteria scheduling ⋮ An interactive decision support system for the resource constrained scheduling problem ⋮ Scheduling unit processing time jobs on a single machine with multiple criteria ⋮ An interactive reference point approach for multiobjective mixed-integer programming using branch-and-bound ⋮ Zum spieltheoretlschen kompromiß in der vektoroptimierung ⋮ Analysis of multicriteria decision aid in Europe
Cites Work
- Partitioning procedures for solving mixed-variables programming problems
- Solving a bicriterion scheduling problem
- Multiple criteria problem solving. Proceedings of a conference. Buffalo, N.Y. (U.S.A.), August 22-26, 1977
- Linear programming with multiple objective functions: Step method (stem)
- Unnamed Item
- Unnamed Item
This page was built for publication: On the interactive solution to a multicriteria scheduling problem
