AbstractWe analyze the arithmetic complexity of the linear programming feasibility problem over the reals. For the case of polyhedra defined by 2n half-spaces in Rn we prove that the set I(2n,n), of parameters describing nonempty polyhedra, has an exponential number of limiting hypersurfaces. From this geometric result we obtain, as a corollary, the existence of a constant c>1 such that, if dense or sparse representation is used to code polynomials, the length of any quantifier-free formula expressing the set I(2n,n) is bounded from below by Ω(cn). Other related complexity results are stated; in particular, a lower bound for algebraic computation trees based on the notion of limiting hypersurface is presented
We study complexity measures on subsets of the boolean hypercube and exhibit connections between alg...
We show that proving lower bounds in algebraic models of computation may not be easier than in the s...
AbstractWe consider the average-case complexity of some otherwise undecidable or open Diophantine pr...
AbstractWe analyze the arithmetic complexity of the linear programming feasibility problem over the ...
We discuss the impact of data structures in quantifier elimination. We analyze the arithmetic comple...
AbstractWe give new positive and negative results, some conditional, on speeding up computational al...
AbstractThe complexity of linear programming and other problems in the geometry of d-dimensions is s...
We consider linear problems in fields, ordered fields, discretely valued fields (with finite residue...
We prove that there are 0/1 polytopes P⊆R[superscript n] that do not admit a compact LP formulation...
Exploring the power of linear programming for combinatorial optimization problems has been recently ...
The relaxation complexity rc(X) of the set of integer points X contained in a polyhedron is the smal...
This series of papers presents a complete development and complexity analysis of a decision method, ...
Abstract. Let f, g1,..., gm be elements of the polynomial ring R[x1,..., xn]. The paper deals with t...
Linear and semidefinite programs are fundamental algorithmic tools, often providing conjecturallyopt...
We prove a lower bound of Omega(n^2/log^2 n) on the size of any syntactically multilinear arithmetic...
We study complexity measures on subsets of the boolean hypercube and exhibit connections between alg...
We show that proving lower bounds in algebraic models of computation may not be easier than in the s...
AbstractWe consider the average-case complexity of some otherwise undecidable or open Diophantine pr...
AbstractWe analyze the arithmetic complexity of the linear programming feasibility problem over the ...
We discuss the impact of data structures in quantifier elimination. We analyze the arithmetic comple...
AbstractWe give new positive and negative results, some conditional, on speeding up computational al...
AbstractThe complexity of linear programming and other problems in the geometry of d-dimensions is s...
We consider linear problems in fields, ordered fields, discretely valued fields (with finite residue...
We prove that there are 0/1 polytopes P⊆R[superscript n] that do not admit a compact LP formulation...
Exploring the power of linear programming for combinatorial optimization problems has been recently ...
The relaxation complexity rc(X) of the set of integer points X contained in a polyhedron is the smal...
This series of papers presents a complete development and complexity analysis of a decision method, ...
Abstract. Let f, g1,..., gm be elements of the polynomial ring R[x1,..., xn]. The paper deals with t...
Linear and semidefinite programs are fundamental algorithmic tools, often providing conjecturallyopt...
We prove a lower bound of Omega(n^2/log^2 n) on the size of any syntactically multilinear arithmetic...
We study complexity measures on subsets of the boolean hypercube and exhibit connections between alg...
We show that proving lower bounds in algebraic models of computation may not be easier than in the s...
AbstractWe consider the average-case complexity of some otherwise undecidable or open Diophantine pr...