We show that computing the strongest polynomial invariant for single-path loops with polynomial assignments is at least as hard as the Skolem problem, a famous problem whose decidability has been open for almost a century. While the strongest polynomial invariants are computable for affine loops, for polynomial loops the problem remained wide open. As an intermediate result of independent interest, we prove that reachability for discrete polynomial dynamical systems is Skolem-hard as well. Furthermore, we generalize the notion of invariant ideals and introduce moment invariant ideals for probabilistic programs. With this tool, we further show that the strongest polynomial moment invariant is (i) uncomputable, for probabilistic loops with br...
We show that every set in the ΘP2 level of the polynomial hierarchy -- that is, every set polynomial...
The theory of n-fold integer programming has been recently emerging as an important tool in paramete...
In this paper, we study the question of hardness-randomness tradeoffs for bounded depth arithmetic c...
We consider the classical problem of invariant generation for programs with polynomial assignments a...
Weak probabilistic bisimulation on probabilistic automata can be decided by an algorithm that needs ...
We consider the classical problem of invariant generation for programs with polynomial assignments a...
In 2008, Ben-Amram, Jones and Kristiansen showed that for a simple programming language|representing...
In this paper we study and relate several invariants connected to the solving degree of a polynomial...
Computational invariant theory considers two problems in the representations of algebraic groups: co...
One of the main challenges in the analysis of probabilistic programs is to compute invariant propert...
AbstractThis paper presents a method for automatically generating all polynomial invariants in simpl...
In 2008, Ben-Amram, Jones and Kristiansen showed that for a simple programming language - representi...
We study systems of equations of the form $X_1 = f_1(X_1, ldots, X_n), ldots, X_n = f_n(X_1, ldots, ...
AbstractA method for generating polynomial invariants of imperative programs is presented using the ...
In recent years, many probabilistic algorithms (i.e., algorithms that can toss coins) that run in po...
We show that every set in the ΘP2 level of the polynomial hierarchy -- that is, every set polynomial...
The theory of n-fold integer programming has been recently emerging as an important tool in paramete...
In this paper, we study the question of hardness-randomness tradeoffs for bounded depth arithmetic c...
We consider the classical problem of invariant generation for programs with polynomial assignments a...
Weak probabilistic bisimulation on probabilistic automata can be decided by an algorithm that needs ...
We consider the classical problem of invariant generation for programs with polynomial assignments a...
In 2008, Ben-Amram, Jones and Kristiansen showed that for a simple programming language|representing...
In this paper we study and relate several invariants connected to the solving degree of a polynomial...
Computational invariant theory considers two problems in the representations of algebraic groups: co...
One of the main challenges in the analysis of probabilistic programs is to compute invariant propert...
AbstractThis paper presents a method for automatically generating all polynomial invariants in simpl...
In 2008, Ben-Amram, Jones and Kristiansen showed that for a simple programming language - representi...
We study systems of equations of the form $X_1 = f_1(X_1, ldots, X_n), ldots, X_n = f_n(X_1, ldots, ...
AbstractA method for generating polynomial invariants of imperative programs is presented using the ...
In recent years, many probabilistic algorithms (i.e., algorithms that can toss coins) that run in po...
We show that every set in the ΘP2 level of the polynomial hierarchy -- that is, every set polynomial...
The theory of n-fold integer programming has been recently emerging as an important tool in paramete...
In this paper, we study the question of hardness-randomness tradeoffs for bounded depth arithmetic c...