Add to ORKGWe consider a class of arithmetic equations over the complete lattice of integers (extended with− ∞ and∞) and provide a polynomial time algorithm for computing least solutions. For systems of equations with addition and least upper bounds, this algorithm is a smooth generalization of the Bellman-Ford al-gorithm for computing the single source shortest path in presence of positive and negative edge weights. The method then is extended to deal with more general forms of operations as well as minima with constants. For the latter, a controlled widening is applied at loops where unbounded increase occurs. We apply this algorithm to construct a cubic time algorithm for the class of interval equations using least upper bounds, addition, intersect...
AbstractThis paper presents some topological and graph theoretical properties of the solution set of...
AbstractThis is a brief survey of some of the applications of interval mathematics to the solution o...
We study the design of fixed-parameter algorithms for problems already known to be solvable in polyn...
Abstract. We present a practical algorithm for computing least solutions of sys-tems of equations ov...
We present a practical algorithm for computing least solutions of systems of (fixpoint-)equations ov...
AbstractIn this paper, we study the problem of solving integer range constraints that arise in many ...
We study the design of fixed-parameter algorithms for problems already known to be solvable in polyn...
Design automation requires reliable methods for solving the equations describing the perfor-mance of...
Idempotent mathematics, which is based on the so-called idempotent superposition principle, has achi...
The purpose of this thesis is to find the inclusion of polynomial zeros by using interval analysis a...
AbstractIn this paper, we study the problem of solving integer range constraints that arise in many ...
summary:Computing powers of interval matrices is a computationally hard problem. Indeed, it is NP-ha...
summary:Computing powers of interval matrices is a computationally hard problem. Indeed, it is NP-ha...
summary:Computing powers of interval matrices is a computationally hard problem. Indeed, it is NP-ha...
Abstract. The idea of interval arithmetic, proposed by Moore, is to enclose the exact value of a rea...
AbstractThis paper presents some topological and graph theoretical properties of the solution set of...
AbstractThis is a brief survey of some of the applications of interval mathematics to the solution o...
We study the design of fixed-parameter algorithms for problems already known to be solvable in polyn...
Abstract. We present a practical algorithm for computing least solutions of sys-tems of equations ov...
We present a practical algorithm for computing least solutions of systems of (fixpoint-)equations ov...
AbstractIn this paper, we study the problem of solving integer range constraints that arise in many ...
We study the design of fixed-parameter algorithms for problems already known to be solvable in polyn...
Design automation requires reliable methods for solving the equations describing the perfor-mance of...
Idempotent mathematics, which is based on the so-called idempotent superposition principle, has achi...
The purpose of this thesis is to find the inclusion of polynomial zeros by using interval analysis a...
AbstractIn this paper, we study the problem of solving integer range constraints that arise in many ...
summary:Computing powers of interval matrices is a computationally hard problem. Indeed, it is NP-ha...
summary:Computing powers of interval matrices is a computationally hard problem. Indeed, it is NP-ha...
summary:Computing powers of interval matrices is a computationally hard problem. Indeed, it is NP-ha...
Abstract. The idea of interval arithmetic, proposed by Moore, is to enclose the exact value of a rea...
AbstractThis paper presents some topological and graph theoretical properties of the solution set of...
AbstractThis is a brief survey of some of the applications of interval mathematics to the solution o...
We study the design of fixed-parameter algorithms for problems already known to be solvable in polyn...