We consider the following problem: given a program, find tight asymptotic bounds on the values of some variables at the end of the computation (or at any given program point) in terms of its input values. We focus on the case of polynomially-bounded variables, and on a weak programming language for which we have recently shown that tight bounds for polynomially-bounded variables are computable. These bounds are sets of multivariate polynomials. While their computability has been settled, the complexity of this program-analysis problem remained open. In this paper, we show the problem to be PSPACE-complete. The main contribution is a new, space-efficient analysis algorithm. This algorithm is obtained in a few steps. First, we develop...
We show that computing the strongest polynomial invariant for single-path loops with polynomial assi...
Vector Addition Systems with States (VASS) provide a well-known and fundamental model for the analys...
AbstractWe present a new method to obtain lower bounds for the time complexity of polynomial evaluat...
We consider the following problem: given a program, find tight asymptotic bounds on the values of s...
We consider the following problem: given a program, find tight asymptoticbounds on the values of som...
In 2008, Ben-Amram, Jones and Kristiansen showed that for a simple programming language|representing...
In 2008, Ben-Amram, Jones and Kristiansen showed that for a simple programming language - representi...
In 1979, Valiant showed that the complexity class VPe of families with polynomially bounded formula ...
International audienceEvery component in the program development chain uses a model to represent and...
The problem of integer programming in bounded variables, over constraints with no more than twovari...
In 1979 Valiant showed that the complexity class VP_e of families with polynomially bounded formula ...
We consider the fundamental problem of reachability analysis over imperative programs with real vari...
We present ABC, a software tool for automatically computing symbolic upper bounds on the number of i...
AbstractThis paper is concerned with exact real solving of well-constrained, bivariate polynomial sy...
Intuitively, if we can prove that a program terminates, we expect some conclusion re-garding its com...
We show that computing the strongest polynomial invariant for single-path loops with polynomial assi...
Vector Addition Systems with States (VASS) provide a well-known and fundamental model for the analys...
AbstractWe present a new method to obtain lower bounds for the time complexity of polynomial evaluat...
We consider the following problem: given a program, find tight asymptotic bounds on the values of s...
We consider the following problem: given a program, find tight asymptoticbounds on the values of som...
In 2008, Ben-Amram, Jones and Kristiansen showed that for a simple programming language|representing...
In 2008, Ben-Amram, Jones and Kristiansen showed that for a simple programming language - representi...
In 1979, Valiant showed that the complexity class VPe of families with polynomially bounded formula ...
International audienceEvery component in the program development chain uses a model to represent and...
The problem of integer programming in bounded variables, over constraints with no more than twovari...
In 1979 Valiant showed that the complexity class VP_e of families with polynomially bounded formula ...
We consider the fundamental problem of reachability analysis over imperative programs with real vari...
We present ABC, a software tool for automatically computing symbolic upper bounds on the number of i...
AbstractThis paper is concerned with exact real solving of well-constrained, bivariate polynomial sy...
Intuitively, if we can prove that a program terminates, we expect some conclusion re-garding its com...
We show that computing the strongest polynomial invariant for single-path loops with polynomial assi...
Vector Addition Systems with States (VASS) provide a well-known and fundamental model for the analys...
AbstractWe present a new method to obtain lower bounds for the time complexity of polynomial evaluat...