This paper presents a theory of non-linear integer/real arithmetic and algorithms for reasoning about this theory. The theory can be conceived as an extension of linear integer/real arithmetic with a weakly-axiomatized multiplication symbol, which retains many of the desirable algorithmic properties of linear arithmetic. In particular, we show that the conjunctive fragment of the theory can be effectively manipulated (analogously to the usual operations on convex polyhedra, the conjunctive fragment of linear arithmetic). As a result, we can solve the following consequence-finding problem: given a ground formula F, find the strongest conjunctive formula that is entailed by F. As an application of consequence-finding, we give a loop invariant...
International audienceWe present several new techniques for linear arithmetic constraint solving. Th...
We study the properties of the constructive linear programing problems. The parameters of linear fun...
We study the problems of deciding whether a relation definable by a first-order formula in linear ra...
We show that proving mildly super-linear lower bounds on non-commutative arithmetic circuits implies...
AbstractAn algebraic technique for reasoning about recursive programs is proposed. The technique is ...
AbstractThis is a survey of the systematic study of weak axiom systems for Arithmetic (in short: “We...
We consider the integers using the language of ordered rings extended by ternary symbols for congrue...
We use µMALL, the logic that results from adding least and greatest fixed points to first-order mult...
We show that proving mildly super-linear lower bounds on non-commutative arithmetic circuits implies...
AbstractWe study a new method for proving lower bounds for subclasses of arithmetic circuits. Roughl...
Thesis (Ph.D.)--University of Washington, 2020Automated theorem provers have long struggled to effic...
We consider feasibility of linear integer programs in the context of verification systems such as SM...
We study versions of second-order bounded arithmetic where induction and comprehension formulae are ...
AbstractWe study possible formulations of algebraic propositional proof systems operating with nonco...
In this thesis we present a solution to the interpolation problem of LA(Z) based on interpolant gene...
International audienceWe present several new techniques for linear arithmetic constraint solving. Th...
We study the properties of the constructive linear programing problems. The parameters of linear fun...
We study the problems of deciding whether a relation definable by a first-order formula in linear ra...
We show that proving mildly super-linear lower bounds on non-commutative arithmetic circuits implies...
AbstractAn algebraic technique for reasoning about recursive programs is proposed. The technique is ...
AbstractThis is a survey of the systematic study of weak axiom systems for Arithmetic (in short: “We...
We consider the integers using the language of ordered rings extended by ternary symbols for congrue...
We use µMALL, the logic that results from adding least and greatest fixed points to first-order mult...
We show that proving mildly super-linear lower bounds on non-commutative arithmetic circuits implies...
AbstractWe study a new method for proving lower bounds for subclasses of arithmetic circuits. Roughl...
Thesis (Ph.D.)--University of Washington, 2020Automated theorem provers have long struggled to effic...
We consider feasibility of linear integer programs in the context of verification systems such as SM...
We study versions of second-order bounded arithmetic where induction and comprehension formulae are ...
AbstractWe study possible formulations of algebraic propositional proof systems operating with nonco...
In this thesis we present a solution to the interpolation problem of LA(Z) based on interpolant gene...
International audienceWe present several new techniques for linear arithmetic constraint solving. Th...
We study the properties of the constructive linear programing problems. The parameters of linear fun...
We study the problems of deciding whether a relation definable by a first-order formula in linear ra...