We consider the satisfiability problem for Boolean combinations of unit two variable per inequality (UTVPI) constraints. Our result can be used in a nite instantiation-based approach to deciding satisability of UTVPI formulas. An experimental evaluation demonstrates the eciency of such an approach. One of our key results is to show that an integer point inside a UTVPI polyhedron, if one exists, can be obtained by rounding a vertex. As a corollary of this result, we also obtain a polynomial-time algorithm for approximating optima of UTVPI integer programs to within an additive factor
The problem of integer programming in bounded variables, over constraints with no more than twovari...
Algorithms for the proportional rounding of a nonnegative vector, and for the biproportional roundin...
For an integer [various formulas omitted]. The quantity t(d) was introduced by Dash, Fukasawa, and G...
We consider the satisfiability problem for Boolean combinations of unit two variable per inequali...
Integer octagonal constraints (a.k.a. Unit Two Variables Per Inequality or UTVPI integer constraints...
Many static analysis problems involve solving mathematical data-flow equations over numerical abstr...
This thesis is concerned with the design and analysis of time-optimal and spaceoptimal, certifying a...
Submodular constraints play an important role both in theory and practice of valued constraint satis...
AbstractRobustness problems due to the substitution of the exact computation on real numbers by the ...
Submodular constraints play an important role both in theory and practice of valued constraint satis...
AbstractLogic constraint satisfaction problems are in general NP-hard and a general deterministic po...
AbstractWe present in this paper a unified processing for real, integer, and Boolean constraints bas...
When developing an exact algorithm for a combinatorial optimisation problem, it often helps to have ...
In this paper we describe two Propositional Satisfiability-based algorithms for solving 0-1 integer ...
Pseudo-Boolean constraints are equations or inequalities between integer polynomials in 0-1 variable...
The problem of integer programming in bounded variables, over constraints with no more than twovari...
Algorithms for the proportional rounding of a nonnegative vector, and for the biproportional roundin...
For an integer [various formulas omitted]. The quantity t(d) was introduced by Dash, Fukasawa, and G...
We consider the satisfiability problem for Boolean combinations of unit two variable per inequali...
Integer octagonal constraints (a.k.a. Unit Two Variables Per Inequality or UTVPI integer constraints...
Many static analysis problems involve solving mathematical data-flow equations over numerical abstr...
This thesis is concerned with the design and analysis of time-optimal and spaceoptimal, certifying a...
Submodular constraints play an important role both in theory and practice of valued constraint satis...
AbstractRobustness problems due to the substitution of the exact computation on real numbers by the ...
Submodular constraints play an important role both in theory and practice of valued constraint satis...
AbstractLogic constraint satisfaction problems are in general NP-hard and a general deterministic po...
AbstractWe present in this paper a unified processing for real, integer, and Boolean constraints bas...
When developing an exact algorithm for a combinatorial optimisation problem, it often helps to have ...
In this paper we describe two Propositional Satisfiability-based algorithms for solving 0-1 integer ...
Pseudo-Boolean constraints are equations or inequalities between integer polynomials in 0-1 variable...
The problem of integer programming in bounded variables, over constraints with no more than twovari...
Algorithms for the proportional rounding of a nonnegative vector, and for the biproportional roundin...
For an integer [various formulas omitted]. The quantity t(d) was introduced by Dash, Fukasawa, and G...