Add to ORKGTitle: Optimization Problems under (max, min)-Linear Constraints and Some Related Topics. Author: Mahmoud Gad Department/Institue: Department of Probability and Mathematical Statis- tics Supervisor of the doctoral thesis: 1. Prof. RNDr. Karel Zimmermann,DrSc 2. Prof. Dr. Assem Tharwat, Cairo University, Egypt Abstract: Problems on algebraic structures, in which pairs of operations such as (max, +) or (max, min) replace addition and multiplication of the classical linear algebra have appeared in the literature approximately since the sixties of the last century. The first publications on these algebraic structures ap- peared by Shimbel [37] who applied these ideas to communication networks, Cunninghame-Green [12, 13], Vorobjov [40] and Gidff...
summary:Max-min algebra is an algebraic structure in which classical addition and multiplication are...
AbstractWe consider combinatorial optimization problems with a feasible solution set S⊆{0,1}n specif...
The max-plus algebra defined with the set with two binary operations and , where , for all ...
summary:$(\max ,+)$-linear functions are functions which can be expressed as the maximum of a finite...
AbstractLet a⊕b=max(a,b), a⊗b=a+b for a,b∈R:=R∪{−∞}. By max-algebra we understand the analogue of li...
summary:$(\max ,+)$-linear functions are functions which can be expressed as the maximum of a finite...
We introduce an optimization problem called a minimax program that is similar to a linear program, e...
AbstractThe paper was motivated by solution methods suggested in the literature for solving linear o...
summary:Max-min algebra and its various aspects have been intensively studied by many authors [1, 4]...
Max-plus algebra is an algebra that is entirely based on the mathematical operations max(a,b) and a+...
Let a ⊕ b = max(a,b)and a ⊗ b = a+b for a,b ∈ R: = R∪(-∞) and extend the pair of operations to matri...
AbstractMax-linear programs have been used to describe optimisation problems for multiprocessor inte...
In this thesis we study a constraint optimisation problem called the maximum solution problem, hence...
Abstract. Exotic semirings such as the “(max;+) semiring” (R [ f1g;max;+), or the “tropical semiring...
AbstractLet a⊕b=max(a,b), a⊗b=a+b for a,b∈R:=R∪{−∞}. By max-algebra we understand the analogue of li...
summary:Max-min algebra is an algebraic structure in which classical addition and multiplication are...
AbstractWe consider combinatorial optimization problems with a feasible solution set S⊆{0,1}n specif...
The max-plus algebra defined with the set with two binary operations and , where , for all ...
summary:$(\max ,+)$-linear functions are functions which can be expressed as the maximum of a finite...
AbstractLet a⊕b=max(a,b), a⊗b=a+b for a,b∈R:=R∪{−∞}. By max-algebra we understand the analogue of li...
summary:$(\max ,+)$-linear functions are functions which can be expressed as the maximum of a finite...
We introduce an optimization problem called a minimax program that is similar to a linear program, e...
AbstractThe paper was motivated by solution methods suggested in the literature for solving linear o...
summary:Max-min algebra and its various aspects have been intensively studied by many authors [1, 4]...
Max-plus algebra is an algebra that is entirely based on the mathematical operations max(a,b) and a+...
Let a ⊕ b = max(a,b)and a ⊗ b = a+b for a,b ∈ R: = R∪(-∞) and extend the pair of operations to matri...
AbstractMax-linear programs have been used to describe optimisation problems for multiprocessor inte...
In this thesis we study a constraint optimisation problem called the maximum solution problem, hence...
Abstract. Exotic semirings such as the “(max;+) semiring” (R [ f1g;max;+), or the “tropical semiring...
AbstractLet a⊕b=max(a,b), a⊗b=a+b for a,b∈R:=R∪{−∞}. By max-algebra we understand the analogue of li...
summary:Max-min algebra is an algebraic structure in which classical addition and multiplication are...
AbstractWe consider combinatorial optimization problems with a feasible solution set S⊆{0,1}n specif...
The max-plus algebra defined with the set with two binary operations and , where , for all ...