Add to ORKGIn this paper it is shown that the compact linearization approach, that has been previously proposed only for binary quadratic problems with assignment constraints, can be generalized to arbitrary linear equations with positive coefficients which considerably enlarges its applicability. We discuss special cases of prominent quadratic combinatorial optimization problems where the obtained compact linearization yields a continuous relaxation that is provably as least as strong as the one obtained with an ordinary linearization
Abstract: In past several linearization of the Quadratic Assignment Problem (QAP) which is a NP-hard...
Abstract. Many combinatorial optimization problems can be formulated as the minimization of a 0-1 qu...
In this paper, we present an effective algorithm for globally solving quadratic programs with quadra...
In this paper, the compact linearization approach originally proposed for binary quadratic programs ...
We introduce and prove new necessary and sufficient conditions to carry out a compact linearization ...
We perform a theoretical and computational study of the classical linearisation techniques (LT) and ...
We provide several applications of the linearization problem of a binary quadratic problem. We propo...
A linearization technique for binary quadratic programs (BQPs) that comprise linear constraints is p...
We consider problem (QP) of minimizing a quadratic function subject to linear or quadratic constrain...
We consider binary quadratic programs (QP) having a quadratic objectivefunction, linear constraints...
We address the exact solution of general integer quadratic programs with linear constraints. These p...
Many combinatorial optimization problems can be formulated as the minimization of a 0?1 quadratic fu...
The computational performance of inductive linearizations for binary quadratic programs in combinati...
AbstractWe present and compare three new compact linearizations for the quadratic 0–1 minimization p...
The quadratic shortest path problem (QSPP) has a lot of applications in real-life problems. This the...
Abstract: In past several linearization of the Quadratic Assignment Problem (QAP) which is a NP-hard...
Abstract. Many combinatorial optimization problems can be formulated as the minimization of a 0-1 qu...
In this paper, we present an effective algorithm for globally solving quadratic programs with quadra...
In this paper, the compact linearization approach originally proposed for binary quadratic programs ...
We introduce and prove new necessary and sufficient conditions to carry out a compact linearization ...
We perform a theoretical and computational study of the classical linearisation techniques (LT) and ...
We provide several applications of the linearization problem of a binary quadratic problem. We propo...
A linearization technique for binary quadratic programs (BQPs) that comprise linear constraints is p...
We consider problem (QP) of minimizing a quadratic function subject to linear or quadratic constrain...
We consider binary quadratic programs (QP) having a quadratic objectivefunction, linear constraints...
We address the exact solution of general integer quadratic programs with linear constraints. These p...
Many combinatorial optimization problems can be formulated as the minimization of a 0?1 quadratic fu...
The computational performance of inductive linearizations for binary quadratic programs in combinati...
AbstractWe present and compare three new compact linearizations for the quadratic 0–1 minimization p...
The quadratic shortest path problem (QSPP) has a lot of applications in real-life problems. This the...
Abstract: In past several linearization of the Quadratic Assignment Problem (QAP) which is a NP-hard...
Abstract. Many combinatorial optimization problems can be formulated as the minimization of a 0-1 qu...
In this paper, we present an effective algorithm for globally solving quadratic programs with quadra...