AbstractWe consider the problem of simplifying the control structure of programs that manipulate numbers. In particular, we examine some simple programming language constructs which have sufficient computational power to eliminate all or most branching instructions (e.g. ‘while’, ‘if-then-else’ and ‘goto’ constructs) from such programs. We show that the operation of integer division by 2 is of considerable importance in this context. We also show that integer division by 2 cannot be computed by any loop-free program over the set of rational instructions, and hence that the power of integer division by 2 is, in a sense, greater than that of the conditional and unconditional branching instructions. We also investigate the power of indirect ad...
Colloque avec actes et comité de lecture. internationale.International audienceIn this paper, we dea...
In this paper we discuss the issue of the minimal instruction set necessary for universal computatio...
A cutting plane technique with applicability to the solution of general integer programs is presente...
AbstractWe consider the problem of simplifying the control structure of programs that manipulate num...
Integer division, modulo, and remainder operations are expressive and useful operations. They are lo...
Integer programs are harder to solve than linear programs of similar size. Even those of modest size...
We investigate the use of cutting planes for integer programs with general integer variables. We sho...
We examine ways to reformulate integer and mixed integer programs. Typically, but not exclusively, o...
Submitted to 10th IEEE Symposium on Computer Arithmetic.Integer division is considered within the co...
The thesis argues the case for exploiting certain structures in integer linear programs.\ud \ud Inte...
. We prove that the graph of integer multiplication requires nondeterministic read-k-times branchin...
The model of arithmetic branching programs is an algebraic model of computation generalizing the mod...
Abstract. Creating good integer programming formulations had, as a basic axiom, the rule “Find formu...
Dantzig-Wolfe decomposition as applied to an integer program is a specific form of problem reformula...
Creating good integer programming formulations had, as a basic axiom, the rule “Find formulations wi...
Colloque avec actes et comité de lecture. internationale.International audienceIn this paper, we dea...
In this paper we discuss the issue of the minimal instruction set necessary for universal computatio...
A cutting plane technique with applicability to the solution of general integer programs is presente...
AbstractWe consider the problem of simplifying the control structure of programs that manipulate num...
Integer division, modulo, and remainder operations are expressive and useful operations. They are lo...
Integer programs are harder to solve than linear programs of similar size. Even those of modest size...
We investigate the use of cutting planes for integer programs with general integer variables. We sho...
We examine ways to reformulate integer and mixed integer programs. Typically, but not exclusively, o...
Submitted to 10th IEEE Symposium on Computer Arithmetic.Integer division is considered within the co...
The thesis argues the case for exploiting certain structures in integer linear programs.\ud \ud Inte...
. We prove that the graph of integer multiplication requires nondeterministic read-k-times branchin...
The model of arithmetic branching programs is an algebraic model of computation generalizing the mod...
Abstract. Creating good integer programming formulations had, as a basic axiom, the rule “Find formu...
Dantzig-Wolfe decomposition as applied to an integer program is a specific form of problem reformula...
Creating good integer programming formulations had, as a basic axiom, the rule “Find formulations wi...
Colloque avec actes et comité de lecture. internationale.International audienceIn this paper, we dea...
In this paper we discuss the issue of the minimal instruction set necessary for universal computatio...
A cutting plane technique with applicability to the solution of general integer programs is presente...