Your search keyword '"Quantifier elimination"' showing total 787 results

1. Interval Quadratic Equations: A Review.

Author

Elishakoff, Isaac and Yvain, Nicolas

Subjects

QUADRATIC equations, COEFFICIENTS (Statistics), ALGEBRA, INTERVAL analysis, MATHEMATICAL variables

Abstract

In this study, we tackle the subject of interval quadratic equations and we aim to accurately determine the root enclosures of quadratic equations, whose coefficients constitute interval variables. This study focuses on interval quadratic equations that contain only one coefficient considered as an interval variable. The four methods reviewed here in order to solve this problem are: (i) the method of classic interval analysis used by Elishakoff and Daphnis, (ii) the direct method based on minimizations and maximizations also used by the same authors, (iii) the method of quantifier elimination used by Ioakimidis, and (iv) the interval parametrization method suggested by Elishakoff and Miglis and again based on minimizations and maximizations. We will also compare the results yielded by all these methods by using the computer algebra system Mathematica for computer evaluations (including quantifier eliminations) in order to conclude which method would be the most efficient way to solve problems relevant to interval quadratic equations. [ABSTRACT FROM AUTHOR]

Published

2023

2. Poly-algorithmic techniques in real quantifier elimination

Author

Tonks, Zak, Davenport, James, and Bradford, Russell

Subjects

Quantifier Elimination, Virtual Term Substitution, Cylindrical Algebraic Decomposition, Computer Algebra

Abstract

Quantifier Elimination over the Reals (QE) is a topic in Computer Algebra concerning elimination of quantifiers from boolean formulae of polynomial constraints. QE is known to be worst case doubly exponential time complexity in the number of variables, so optimisation in this area is always of interest. Otherwise, improvements with respect to interface can make usage of QE more tractable. QE problems arise in a range of contexts, notably motion planning (such as robotics), biology, mechanics, and finance. Largely, this work discusses the implementation of a new package QuantifierElimination for the Computer Algebra software Maple. This package, developed in collaboration with Maplesoft, is an amalgamation of contemporary research on two main algorithms for QE, Virtual Term Substitution (VTS) and Cylindrical Algebraic Decomposition (CAD), but a main focus is an investigation into the efficiency & efficacy of a new "poly-algorithm" between these two algorithms. The implementation of CAD includes the first known usage of the Lazard projection for CAD in Maple, and the first known implementation & investigation of new research for equational constraint optimisations with the Lazard projection in CAD. Such equational constraint optimisations may induce mathematical "curtain" occurrences which are ordinarily cause for failure to construct a CAD with frequently desired properties. In conjunction with the first implementation of relevant algorithms from other research, methodology is delineated to ignore, or else attempt to recover from any general failure to construct or evaluate parts of the CAD for QE, including curtains. QuantifierElimination also allows for generation of full CADs without the context of QE, where users can inspect individual cells via various object methods, with the package being largely object oriented where appropriate. Generation of CADs in unquantified contexts has uses in motion planning and real algebraic geometry. Quite often the thesis focuses on finer implementation details & challenges, including with respect to the recent research on equational constraints. Other aims for the package are rich output and "incrementality", to meet the usual aims of implementations of algorithms for QE to be used within Satisfiability Modulo Theory (SMT) solving for the theory of real arithmetic (QF_NRA). Rich output includes production of "witnesses" for fully homogeneously quantified problems, which prove the equivalence of a subset of problems to their quantifier free equivalent. Extension of existing methods enables production of witnesses where the framework of the new polyalgorithm is concerned. The poly-algorithmic methods are extended to be incremental for QE as well. There are a wealth of keyword options and customizable levels of user information to print for users, as the package aims to reconcile with Maple's status as a mathematical toolbox to be easy to use with in depth information being readily available for experienced geometers. Other functions are more pedagogical to accommodate users new to problem formulations in QE and real algebraic geometry. The software is compared via benchmarking against existing QE and CAD software, especially existing packages in Maple, and investigates case studies on examples to demonstrate new methodologies and research.

Published

2021

3. Systematic Analysis and Design of Control Systems Based on Lyapunov's Direct Method.

Author

Voßwinkel, Rick and Röbenack, Klaus

Subjects

*LYAPUNOV functions, *NONLINEAR dynamical systems, *DECOMPOSITION method, *SUM of squares, *LYAPUNOV stability

Abstract

This paper deals with systematic approaches for the analysis of stability properties and controller design for nonlinear dynamical systems. Numerical methods based on sum-of-squares decomposition or algebraic methods based on quantifier elimination are used. Starting from Lyapunov's direct method, these methods can be used to derive conditions for the automatic verification of Lyapunov functions as well as for the structural determination of control laws. This contribution describes methods for the automatic verification of (control) Lyapunov functions as well as for the constructive determination of control laws. [ABSTRACT FROM AUTHOR]

Published

2023

4. ON PRESBURGER ARITHMETIC EXTENDED WITH NON-UNARY COUNTING QUANTIFIERS.

Author

HABERMEHL, PETER and KUSKE, DIETRICH

Subjects

FIRST-order logic, POLYNOMIAL time algorithms, SATISFACTION, COUNTING, LOGIC, INTEGERS, ARITHMETIC

Abstract

We consider a first-order logic for the integers with addition. This logic extends classical first-order logic by modulo-counting, threshold-counting and exact-counting quantifiers, all applied to tuples of variables (here, residues are given as terms while moduli and thresholds are given explicitly). Our main result shows that satisfaction for this logic is decidable in two-fold exponential space. If only threshold- and exact-counting quantifiers are allowed, we prove an upper bound of alternating two-fold exponential time with linearly many alternations. This latter result almost matches Berman's exact complexity of first-order logic without counting quantifiers. To obtain these results, we first translate threshold- and exact-counting quantifiers into classical first-order logic in polynomial time (which already proves the second result). To handle the remaining modulo-counting quantifiers for tuples, we first reduce them in doubly exponential time to modulo-counting quantifiers for single elements. For these quantifiers, we provide a quantifier elimination procedure similar to Reddy and Loveland's procedure for first-order logic and analyse the growth of coefficients, constants, and moduli appearing in this process. The bounds obtained this way allow to restrict quantification in the original formula to integers of bounded size which then implies the first result mentioned above. Our logic is incomparable with the logic considered by Chistikov et al. in 2022. They allow more general counting operations in quantifiers, but only unary quantifiers. The move from unary to non-unary quantifiers is non-trivial, since, e.g., the non-unary version of the Härtig quantifier results in an undecidable theory. [ABSTRACT FROM AUTHOR]

Published

2023

5. Pseudo o-Minimality for Double Stone Algebras

Author

Farhad Jahanian and Jafar Sadegh Eivazloo

Subjects

double stone algebra, definable set, quantifier elimination, pseudo o-minimality, Mathematics, QA1-939

Abstract

Pseudo o-minimality is a generalization of o-minimality of linear orders to partial orders. Recently Lei Chen, Niandong Shi and Guohua Wu provided pseudo o-minimality for the class of Stone algebras. In this note we use quantifier elimination property to show that the class of double Stone algebras is pseudo o-minimal in their expanded language.

Published

2023

6. ZDD Boolean Synthesis

Author

Lin, Yi, Tabajara, Lucas M., Vardi, Moshe Y., Goos, Gerhard, Founding Editor, Hartmanis, Juris, Founding Editor, Bertino, Elisa, Editorial Board Member, Gao, Wen, Editorial Board Member, Steffen, Bernhard, Editorial Board Member, Woeginger, Gerhard, Editorial Board Member, Yung, Moti, Editorial Board Member, Fisman, Dana, editor, and Rosu, Grigore, editor

Published

2022

7. Verification of advanced controllers for safety-critical systems

Author

Siaulys, Kestutis and Maciejowski, Jan

Subjects

629.8, Model Predictive Control (MPC), Formal Methods, Quantifier Elimination, Cylindrical Algebraic Decomposition, Weispfenning's virtual term substitution, Satisfiability Modulo Theories (SMT), Robust Flight Control, Why3, MetiTarski, Exclusion Regions, Structured Singular Value, Explicit Model Predictive Control, Linear Temporal Logic, RECONFIGURE, Simulink

Abstract

In order to design and deploy a feedback controller in a real application, one must determine suitable specifications that the design must meet ("validate"), and then ensure that the chosen specifications have been met ("verify"). In this thesis, we investigate a verification paradigm based on formal methods, such as the Satisfiability Modulo Theories (SMT) and quantifier elimination (Weispfenning's virtual term substitution and quantifier elimination by cylindrical algebraic decomposition) algorithms. Any control design requirement (such as satisfactory performance, robustness to uncertainties, stability, etc.) that can be expressed in a first order logic formula can be (in principle) verified by using one of these methods. Consequently, in principle, this allows us to consider problems like general non-convex optimisation, exact computation of structured singular value, and synthesis of non-convex feasible parameter sets. In practice, the generality of algorithms like quantifier elimination by cylindrical algebraic decomposition come with a downside of high running time when applied to more complex systems with more parameters. This, in some cases, limits the complexity of the system that we could consider. Therefore, we focused our attention on control problems such as obtaining an explicit MPC law for a linear time invariant system with a quadratic objective and polytopic constraints, or computation of the structured singular value for a system under parametric (and not norm-bounded) uncertainty. Such problems can be expressed as quantifier elimination problems with a particular quantification structure that allows us to take advantage of a specialised quantifier elimination algorithm - the quantifier elimination by Weispfenning's virtual term substitution procedure that has much lower worst-case running time on these types of problems than quantifier elimination by cylindrical algebraic decomposition algorithm. Despite these constraints, we were able to apply a quantifier-elimination-based verification framework to clearance of a flight control law developed for a real world industrial system from the aerospace field not only at particular combination of parameters but throughout the whole flight envelope. In conclusion, while in principle formal methods are applicable to a large body of problems arising in control theory, more widespread practical application depends on further research in efficiency and running time improvement in the implementation of these algorithms.

Published

2019

8. Models of Bounded Arithmetic Theories and Some Related Complexity Questions

Author

Abolfazl Alam and Morteza Moniri

Subjects

bounded arithmetic, complexity theory, existentially closed model, model completeness, model companion, quantifier elimination, stone topology, Logic, BC1-199

Abstract

In this paper, we study bounded versions of some model-theoretic notions and results. We apply these results to the context of models of bounded arithmetic theories as well as some related complexity questions. As an example, we show that if the theory \(\rm S_2 ^1(PV)\) has bounded model companion then \(\rm NP=coNP\). We also study bounded versions of some other related notions such as Stone topology.

Published

2022

9. On the Expressiveness of Büchi Arithmetic

Author

Haase, Christoph, Różycki, Jakub, Goos, Gerhard, Founding Editor, Hartmanis, Juris, Founding Editor, Bertino, Elisa, Editorial Board Member, Gao, Wen, Editorial Board Member, Steffen, Bernhard, Editorial Board Member, Woeginger, Gerhard, Editorial Board Member, Yung, Moti, Editorial Board Member, Kiefer, Stefan, editor, and Tasson, Christine, editor

Published

2021

10. Systematic Analysis and Design of Control Systems Based on Lyapunov’s Direct Method

Author

Rick Voßwinkel and Klaus Röbenack

Subjects

sums-of-squares, quantifier elimination, polynomialization, Lyapunov methods, Industrial engineering. Management engineering, T55.4-60.8, Electronic computers. Computer science, QA75.5-76.95

Abstract

This paper deals with systematic approaches for the analysis of stability properties and controller design for nonlinear dynamical systems. Numerical methods based on sum-of-squares decomposition or algebraic methods based on quantifier elimination are used. Starting from Lyapunov’s direct method, these methods can be used to derive conditions for the automatic verification of Lyapunov functions as well as for the structural determination of control laws. This contribution describes methods for the automatic verification of (control) Lyapunov functions as well as for the constructive determination of control laws.

Published

2023

11. On algorithms testing positivity of real symmetric polynomials

Author

Vlad Timofte and Aida Timofte

Subjects

Quantifier elimination, Algorithm, Symmetric polynomial, Mathematics, QA1-939

Abstract

Abstract We show that positivity (≥0) on R + n $\mathbb{R}_{+}^{n}$ and on R n $\mathbb{R}^{n}$ of real symmetric polynomials of degree at most p in n ≥ 2 $n\ge 2$ variables is solvable by algorithms running in polynomial time in the number n of variables. For real symmetric quartics, we find discriminants which lead to the efficient algorithms QE4+ and QE4 running in O ( n ) $O(n)$ time. We describe the Maple implementation of both algorithms, which are then used not only for testing concrete inequalities (with given numerical coefficients and number of variables), but also for proving symbolic inequalities.

Published

2021

12. MODELS OF BOUNDED ARITHMETIC THEORIES AND SOME RELATED COMPLEXITY QUESTIONS.

Author

Alam, Abolfazl and Moniri, Morteza

Subjects

*BOUNDED arithmetics, *TOPOLOGY, *COMPLEXITY (Philosophy)

Abstract

In this paper, we study bounded versions of some model-theoretic notions and results. We apply these results to models of bounded arithmetic theories as well as some related complexity questions. As an example, we show that if the theory S2¹(PV) has bounded model companion then NP = coNP. We also study bounded versions of some other related notions such as Stone topology. [ABSTRACT FROM AUTHOR]

Published

2022

13. Hensel minimality I.

Author

Cluckers, Raf, Halupczok, Immanuel, and Rideau-Kikuchi, Silvain

Subjects

*LIPSCHITZ continuity, *PARAMETERIZATION, *GEOMETRY

Abstract

We present a framework for tame geometry on Henselian valued fields, whichwe call Henselminimality. In the spirit of o-minimality, which is key to real geometry and several diophantine applications, we develop geometric results and applications for Hensel minimal structures that were previously known only under stronger, less axiomatic assumptions. We show the existence of t-stratifications in Hensel minimal structures and Taylor approximation results that are key to non-Archimedean versions of Pila-Wilkie point counting, Yomdin's parameterization results and motivic integration. In this first paper, we work in equi-characteristic zero; in the sequel paper, we develop the mixed characteristic case and a diophantine application. [ABSTRACT FROM AUTHOR]

Published

2022

14. Analytical descriptions of quantifier solutions to interval linear systems of relations.

Author

Sharaya, Irene A. and Shary, Sergey P.

Subjects

*LINEAR systems, *SET theory, *MATHEMATICAL inequalities, *SET-valued maps, *MATHEMATICAL equivalence

Abstract

We study systems of relations of the form A x σ b , where σ is a vector of binary relations with the components " = ", " ≥ ", and " ≤ ", while the parameters (elements of the matrix A and right-hand side vector b) are uncertain and can take values from prescribed intervals. What is considered to be the set of its solutions depends on which logical quantifier is associated with each interval-valued parameter and what is the order of the quantifier prefixes for specific parameters. For solution sets that correspond to the quantifier prefix of a general form, we present equivalent quantifier-free analytical descriptions in the classical interval arithmetic, in Kaucher complete interval arithmetic and in the usual real arithmetic. [ABSTRACT FROM AUTHOR]

Published

2022

15. Hensel minimality I

Author

Raf Cluckers, Immanuel Halupczok, and Silvain Rideau-Kikuchi

Subjects

Non-Archimedean geometry, tame geometry on Henselian valued fields, analogues to o-minimality, cell decomposition, quantifier elimination, Taylor approximation, Lipschitz continuity, 03C99, 03C65, 12J20, 11D88, 03C98, 14E18, 41A58, Mathematics, QA1-939

Abstract

We present a framework for tame geometry on Henselian valued fields, which we call Hensel minimality. In the spirit of o-minimality, which is key to real geometry and several diophantine applications, we develop geometric results and applications for Hensel minimal structures that were previously known only under stronger, less axiomatic assumptions. We show the existence of t-stratifications in Hensel minimal structures and Taylor approximation results that are key to non-Archimedean versions of Pila–Wilkie point counting, Yomdin’s parameterization results and motivic integration. In this first paper, we work in equi-characteristic zero; in the sequel paper, we develop the mixed characteristic case and a diophantine application.

Published

2022

16. Application of LaSalle’s Invariance Principle on Polynomial Differential Equations Using Quantifier Elimination.

Author

Gerbet, Daniel and Robenack, Klaus

Subjects

*STABILITY of nonlinear systems, *DIFFERENTIAL equations, *ALGEBRAIC geometry, *POLYNOMIALS

Abstract

LaSalle’s invariance principle is a commonly used extension of Lyapunov’s second method to study asymptotic stability of nonlinear systems. If the system can be written in polynomial form, the examination can be automated using algebraic geometry and quantifier elimination. This article addresses this automated examination using a method relying on polynomial ideals and applies it on some example systems. In addition, some properties of these special ideals are derived that allow to reduce the computational effort significantly. [ABSTRACT FROM AUTHOR]

Published

2022

17. Some structures interpretable in the ring of continuous semi-algebraic functions on a curve

Author

Phillips, Laura Rose

Subjects

512, Model theory, Semi-algebraic geometry, Quantifier elimination, Decidability

Published

2015

18. Interpolating bit-vector formulas using uninterpreted predicates and Presburger arithmetic.

Author

Backeman, Peter, Rümmer, Philipp, and Zeljić, Aleksandar

Subjects

PROPOSITION (Logic), NONLINEAR equations, LAZINESS, INTERPOLATION, TRANSLATING & interpreting

Abstract

The inference of program invariants over machine arithmetic, commonly called bit-vector arithmetic, is an important problem in verification. Techniques that have been successful for unbounded arithmetic, in particular Craig interpolation, have turned out to be difficult to generalise to machine arithmetic: existing bit-vector interpolation approaches are based either on eager translation from bit-vectors to unbounded arithmetic, resulting in complicated constraints that are hard to solve and interpolate, or on bit-blasting to propositional logic, in the process losing all arithmetic structure. We present a new approach to bit-vector interpolation, as well as bit-vector quantifier elimination (QE), that works by lazy translation of bit-vector constraints to unbounded arithmetic. Laziness enables us to fully utilise the information available during proof search (implied by decisions and propagation) in the encoding, and this way produce constraints that can be handled relatively easily by existing interpolation and QE procedures for Presburger arithmetic. The lazy encoding is complemented with a set of native proof rules for bit-vector equations and non-linear (polynomial) constraints, this way minimising the number of cases a solver has to consider. We also incorporate a method for handling concatenations and extractions of bit-vector efficiently. [ABSTRACT FROM AUTHOR]

Published

2021

19. On algorithms testing positivity of real symmetric polynomials.

Author

Timofte, Vlad and Timofte, Aida

Subjects

*CONCRETE testing, *POLYNOMIALS

Abstract

We show that positivity (≥0) on R + n and on R n of real symmetric polynomials of degree at most p in n ≥ 2 variables is solvable by algorithms running in polynomial time in the number n of variables. For real symmetric quartics, we find discriminants which lead to the efficient algorithms QE4+ and QE4 running in O (n) time. We describe the Maple implementation of both algorithms, which are then used not only for testing concrete inequalities (with given numerical coefficients and number of variables), but also for proving symbolic inequalities. [ABSTRACT FROM AUTHOR]

Published

2021

20. On the complexity of analyticity in semi-definite optimization.

Author

Basu, Saugata and Mohammad-Nezhad, Ali

Subjects

*SEMIDEFINITE programming, *ALGEBRAIC curves, *ALGEBRAIC geometry, *ARITHMETIC

Abstract

It is well-known that the central path of semi-definite optimization, unlike linear optimization, has no analytic extension to μ = 0 in the absence of the strict complementarity condition. In this paper, we consider a reparametrization μ ↦ μ ρ , with ρ being a positive integer, that recovers the analyticity of the central path at μ = 0. We investigate the complexity of computing ρ using algorithmic real algebraic geometry and the theory of complex algebraic curves. We prove that the optimal ρ is bounded by 2 O (m 2 + n 2 m + n 4) , where n is the matrix size and m is the number of affine constraints. Our approach leads to a symbolic algorithm, based on the Newton-Puiseux algorithm, which computes a feasible ρ using 2 O (m + n 2) arithmetic operations. [ABSTRACT FROM AUTHOR]

Published

2024

21. Reachability relations of timed pushdown automata.

Author

Clemente, Lorenzo and Lasota, Sławomir

Subjects

*MACHINE theory, *ARITHMETIC, *LOGIC, *INTEGRALS

Abstract

Timed pushdown automata (tpda) are an expressive formalism combining recursion with a rich logic of timing constraints. We prove that reachability relations of tpda are expressible in linear arithmetic, a rich logic generalising Presburger arithmetic and rational arithmetic. The main technical ingredients are a novel quantifier elimination result for clock constraints (used to simplify the syntax of tpda transitions), the use of clock difference relations to express reachability relations of the fractional clock values, and an application of Parikh's theorem to reconstruct the integral clock values. [ABSTRACT FROM AUTHOR]

Published

2021

22. Combined decision procedures for nonlinear arithmetics, real and complex

Author

Passmore, Grant Olney and Jackson, Paul B.

Subjects

518, mathematical logic, quantifier elimination, real closed fields

Abstract

We describe contributions to algorithmic proof techniques for deciding the satisfiability of boolean combinations of many-variable nonlinear polynomial equations and inequalities over the real and complex numbers. In the first half, we present an abstract theory of Grobner basis construction algorithms for algebraically closed fields of characteristic zero and use it to introduce and prove the correctness of Grobner basis methods tailored to the needs of modern satisfiability modulo theories (SMT) solvers. In the process, we use the technique of proof orders to derive a generalisation of S-polynomial superfluousness in terms of transfinite induction along an ordinal parameterised by a monomial order. We use this generalisation to prove the abstract (“strategy-independent”) admissibility of a number of superfluous S-polynomial criteria important for efficient basis construction. Finally, we consider local notions of proof minimality for weak Nullstellensatz proofs and give ideal-theoretic methods for computing complex “unsatisfiable cores” which contribute to efficient SMT solving in the context of nonlinear complex arithmetic. In the second half, we consider the problem of effectively combining a heterogeneous collection of decision techniques for fragments of the existential theory of real closed fields. We propose and investigate a number of novel combined decision methods and implement them in our proof tool RAHD (Real Algebra in High Dimensions). We build a hierarchy of increasingly powerful combined decision methods, culminating in a generalisation of partial cylindrical algebraic decomposition (CAD) which we call Abstract Partial CAD. This generalisation incorporates the use of arbitrary sound but possibly incomplete proof procedures for the existential theory of real closed fields as first-class functional parameters for “short-circuiting” expensive computations during the lifting phase of CAD. Identifying these proof procedure parameters formally with RAHD proof strategies, we implement the method in RAHD for the case of full-dimensional cell decompositions and investigate its efficacy with respect to the Brown-McCallum projection operator. We end with some wishes for the future.

Published

2011

23. Ascending chains of ideals in the polynomial ring.

Author

PASTUSZAK, Grzegorz

Subjects

*POLYNOMIAL rings, *NATURAL numbers, *QUANTUM information theory, *INVARIANT subspaces, *GROBNER bases

Abstract

Assume that K is a field and I1 ... ... ... It is an ascending chain (of length t) of ideals in the polynomial ring K[x1, ..., xm], for some m ≥ 1. Suppose that Ij is generated by polynomials of degrees less or equal to some natural number f(j) ≥ 1, for any j = 1, ..., t. In the paper we construct, in an elementary way, a natural number B(m, f) (depending on m and the function f) such that t ≤ B(m, f). We also discuss some applications of this result. [ABSTRACT FROM AUTHOR]

Published

2020

24. Dual forgetting operators in the context of weakest sufficient and strongest necessary conditions.

Author

Doherty, Patrick and Szałas, Andrzej

Subjects

*KNOWLEDGE representation (Information theory)

Abstract

Forgetting is an important concept in knowledge representation and automated reasoning with widespread applications across a number of disciplines. A standard forgetting operator, characterized in [26] in terms of model-theoretic semantics and primarily focusing on the propositional case, opened up a new research subarea. In this paper, a new operator called weak forgetting , dual to standard forgetting, is introduced and both together are shown to offer a new more uniform perspective on forgetting operators in general. Both the weak and standard forgetting operators are characterized in terms of entailment and inference, rather than a model theoretic semantics. This naturally leads to a useful algorithmic perspective based on quantifier elimination and the use of Ackermann's Lemma and its fixpoint generalization. The strong formal relationship between standard forgetting and strongest necessary conditions and weak forgetting and weakest sufficient conditions is also characterized quite naturally through the entailment-based, inferential perspective used. The framework used to characterize the dual forgetting operators is also generalized to the first-order case and includes useful algorithms for computing first-order forgetting operators in special cases. Practical examples are also included to show the importance of both weak and standard forgetting in modeling and representation. [ABSTRACT FROM AUTHOR]

Published

2024

25. Application of LaSalle’s Invariance Principle on Polynomial Differential Equations Using Quantifier Elimination

Author

Daniel Gerbet and Klaus Roebenack

Subjects

Control and Systems Engineering, Quantifier elimination, Applied mathematics, Electrical and Electronic Engineering, LaSalle's invariance principle, Polynomial differential equations, Computer Science Applications, Mathematics

Published

2022

26. On the Descriptive Complexity of Color Coding

Author

Max Bannach and Till Tantau

Subjects

color coding, descriptive complexity, fixed-parameter tractability, quantifier elimination, para-AC0, Industrial engineering. Management engineering, T55.4-60.8, Electronic computers. Computer science, QA75.5-76.95

Abstract

Color coding is an algorithmic technique used in parameterized complexity theory to detect “small” structures inside graphs. The idea is to derandomize algorithms that first randomly color a graph and then search for an easily-detectable, small color pattern. We transfer color coding to the world of descriptive complexity theory by characterizing—purely in terms of the syntactic structure of describing formulas—when the powerful second-order quantifiers representing a random coloring can be replaced by equivalent, simple first-order formulas. Building on this result, we identify syntactic properties of first-order quantifiers that can be eliminated from formulas describing parameterized problems. The result applies to many packing and embedding problems, but also to the long path problem. Together with a new result on the parameterized complexity of formula families involving only a fixed number of variables, we get that many problems lie in FPT just because of the way they are commonly described using logical formulas.

Published

2021

27. Walrasian Comparative Studies

Author

Brown, Donald J. and Matzkin, Rosa L.

Subjects

general equilibrium, comparative statics, quantifier elimination

Published

1994

28. Quantifier elimination in matrix algebras

Author

Brüser, Clemens and Brüser, Clemens

Abstract

A recent result on quantifier elimination in matrix algebras due to Klep and Tress is replicated. It is then applied to derive criteria for several questions commonly found in algebra: - Is a matrix positive (semi-)definite? - Is a matrix invertible? - I a linear map a contraction? - Is there a solution to a given matrix equation?, Ein neues Resultat von Klep und Tressl über Quantoren-Elimination in Matrix-Algebren wird präsentiert. Dieses wird auf einige gängige Fragestellungen der Algebra angewandt: - Ist eine Matrix positiv (semi-)definit? - Ist eine Matrix invertierbar? - Ist eine lineare Abbildung eine Kontraktion? - Hat eine gegebene Matrix-Gleichung eine Lösung?, submitted by Mag. phil. Clemens Brüser, Masterarbeit Universität Innsbruck 2022

Published

2022

29. Quantifier Elimination in Stochastic Boolean Satisfiability

Author

Hao-Ren Wang and Kuan-Hua Tu and Jie-Hong Roland Jiang and Christoph Scholl, Wang, Hao-Ren, Tu, Kuan-Hua, Jiang, Jie-Hong Roland, Scholl, Christoph, Hao-Ren Wang and Kuan-Hua Tu and Jie-Hong Roland Jiang and Christoph Scholl, Wang, Hao-Ren, Tu, Kuan-Hua, Jiang, Jie-Hong Roland, and Scholl, Christoph

Abstract

Stochastic Boolean Satisfiability (SSAT) generalizes quantified Boolean formulas (QBFs) by allowing quantification over random variables. Its generality makes SSAT powerful to model decision or optimization problems under uncertainty. On the other hand, the generalization complicates the computation in its counting nature. In this work, we address the following two questions: 1) Is there an analogy of quantifier elimination in SSAT, similar to QBF? 2) If quantifier elimination is possible for SSAT, can it be effective for SSAT solving? We answer them affirmatively, and develop an SSAT decision procedure based on quantifier elimination. Experimental results demonstrate the unique benefits of the new method compared to the state-of-the-art solvers.

Published

2022

30. A First Complete Algorithm for Real Quantifier Elimination in Isabelle/HOL

Author

Kosaian, Katherine, Tan, Yong Kiam, and Platzer, André

Subjects

FOS: Computer and information sciences, Computer Science - Logic in Computer Science, DATA processing & computer science, Logic in Computer Science (cs.LO), Mathematics - Algebraic Geometry, theorem proving, quantifier elimination, real arithmetic, FOS: Mathematics, F.4.1, F.3.1, ddc:004, Algebraic Geometry (math.AG), multivariate polynomials, 68V20, 68V15, 03C10, 03B35, 03B10

Abstract

We formalize a multivariate quantifier elimination (QE) algorithm in the theorem prover Isabelle/HOL. Our algorithm is complete, in that it is able to reduce any quantified formula in the first-order logic of real arithmetic to a logically equivalent quantifier-free formula. The algorithm we formalize is a hybrid mixture of Tarski's original QE algorithm and the Ben-Or, Kozen, and Reif algorithm, and it is the first complete multivariate QE algorithm formalized in Isabelle/HOL., CPP 2023

Published

2022

31. Model Completeness, Uniform Interpolants and Superposition Calculus

Author

Andrey Rivkin, Silvio Ghilardi, Alessandro Gianola, Marco Montali, and Diego Calvanese

Subjects

Model theory, Model checking, Computer science, Context (language use), 0102 computer and information sciences, 02 engineering and technology, 01 natural sciences, Computational Theory and Mathematics, Fragment (logic), 010201 computation theory & mathematics, Artificial Intelligence, 020204 information systems, Quantifier elimination, Superposition calculus, 0202 electrical engineering, electronic engineering, information engineering, Calculus, Automated reasoning, Completeness (statistics), Software

Abstract

Uniform interpolants have been largely studied in non-classical propositional logics since the nineties; a successive research line within the automated reasoning community investigated uniform quantifier-free interpolants (sometimes referred to as “covers”) in first-order theories. This further research line is motivated by the fact that uniform interpolants offer an effective solution to tackle quantifier elimination and symbol elimination problems, which are central in model checking infinite state systems. This was first pointed out in ESOP 2008 by Gulwani and Musuvathi, and then by the authors of the present contribution in the context of recent applications to the verification of data-aware processes. In this paper, we show how covers are strictly related to model completions, a well-known topic in model theory. We also investigate the computation of covers within the Superposition Calculus, by adopting a constrained version of the calculus and by defining appropriate settings and reduction strategies. In addition, we show that computing covers is computationally tractable for the fragment of the language used when tackling the verification of data-aware processes. This observation is confirmed by analyzing the preliminary results obtained using the mcmt tool to verify relevant examples of data-aware processes. These examples can be found in the last version of the tool distribution.

Published

2021

32. The theories of Baldwin–Shi hypergraphs and their atomic models

Author

Danul K. Gunatilleka

Subjects

Random graph, Discrete mathematics, Philosophy, Hypergraph, Alpha (programming language), Mathematics::Combinatorics, Rank (linear algebra), Logic, Atomic theory, Quantifier elimination, Substructure, Context (language use), Mathematics

Abstract

We show that the quantifier elimination result for the Shelah-Spencer almost sure theories of sparse random graphs $$G(n,n^{-\alpha })$$ given by Laskowski (Isr J Math 161:157–186, 2007) extends to their various analogues. The analogues will be obtained as theories of generic structures of certain classes of finite structures with a notion of strong substructure induced by rank functions and we will call the generics Baldwin–Shi hypergraphs. In the process we give a method of constructing extensions whose ‘relative rank’ is negative but arbitrarily small in context. We give a necessary and sufficient condition for the theory of a Baldwin–Shi hypergraph to have atomic models. We further show that for certain well behaved classes of theories of Baldwin–Shi hypergraphs, the existentially closed models and the atomic models correspond.

Published

2021

33. Definable Transformation to Normal Crossings over Henselian Fields with Separated Analytic Structure

Author

Krzysztof Jan Nowak

Subjects

separated analytic structure, strong analytic functions, resolution of singularities, transformation to normal crossings, closedness theorem, quantifier elimination, definable retractions, Mathematics, QA1-939

Abstract

We are concerned with rigid analytic geometry in the general setting of Henselian fields K with separated analytic structure, whose theory was developed by Cluckers−Lipshitz−Robinson. It unifies earlier work and approaches of numerous mathematicians. Separated analytic structures admit reasonable relative quantifier elimination in a suitable analytic language. However, the rings of global analytic functions with two kinds of variables seem not to have good algebraic properties such as Noetherianity or excellence. Therefore, the usual global resolution of singularities from rigid analytic geometry is no longer at our disposal. Our main purpose is to give a definable version of the canonical desingularization algorithm (the hypersurface case) due to Bierstone−Milman so that both of these powerful tools are available in the realm of non-Archimedean analytic geometry at the same time. It will be carried out within a category of definable, strong analytic manifolds and maps, which is more flexible than that of affinoid varieties and maps. Strong analytic objects are those definable ones that remain analytic over all fields elementarily equivalent to K. This condition may be regarded as a kind of symmetry imposed on ordinary analytic objects. The strong analytic category makes it possible to apply a model-theoretic compactness argument in the absence of the ordinary topological compactness. On the other hand, our closedness theorem enables application of resolution of singularities to topological problems involving the topology induced by valuation. Eventually, these three results will be applied to such issues as the existence of definable retractions or extending continuous definable functions. The established results remain valid for strictly convergent analytic structures, whose classical examples are complete, rank one valued fields with the Tate algebras of strictly convergent power series. The earlier techniques and approaches to the purely topological versions of those issues cannot be carried over to the definable settings because, among others, non-Archimedean geometry over non-locally compact fields suffers from lack of definable Skolem functions.

Published

2019

34. Over- and Under-Approximations of Reachable Sets With Series Representations of Evolution Functions

Author

Zhikun She and Meilun Li

Subjects

0209 industrial biotechnology, Polynomial, Series (mathematics), Dynamical systems theory, Computer science, 02 engineering and technology, Function (mathematics), Computer Science Applications, symbols.namesake, 020901 industrial engineering & automation, Control and Systems Engineering, Quantifier elimination, Taylor series, symbols, Applied mathematics, Electrical and Electronic Engineering, Remainder, Representation (mathematics)

Abstract

In this article, we investigate both over- and under-approximations of reachable sets for analytic autonomous dynamical systems beyond polynomial dynamics. We start with the concept of evolution function, whose subzero-level set can be used to describe reachable set, and find a series representation of the evolution function with its Lie derivatives. Afterwards, based on the partial sums of this series, two different methodologies are introduced to compute over- and under-approximations of reachable sets, using numerical quantifier elimination for the semi-algebraic constraints and remainder estimation of the partial sum, respectively. Some benchmarks are given, including an eight-dimensional nonpolynomial quadrotor model, to show the advantages of our computational methods over some existing methods in the literature. Especially, our methods also work for nonconvex initial sets.

Published

2021

35. The lattice of definability. Origins and Directions of Research

Subjects

Pure mathematics, Quantifier (logic), General Mathematics, Quantifier elimination, Alternation (formal language theory), Field (mathematics), Automorphism, Mathematics, Decidability

Abstract

The article presents results and open problems related to definability spaces (reducts) and sources of this field since the XIX century. Finiteness conditions and constraints are investigated, including the depth of quantifier alternation and the number of arguments. Results related to the description of lattices of definability spaces for numerical and other natural structures are described. Research methods include the study of automorphism groups of elementary extensions of the structures under consideration, application of the Svenonius theorem.

Published

2021

36. Efficient Algorithm for Generalized Polynomial Partitioning and Its Applications

Author

Pankaj K. Agarwal, Esther Ezra, Joshua Zahl, and Boris Aronov

Subjects

Combinatorics, Polynomial, Generalized polynomial, General Computer Science, Integer, 010201 computation theory & mathematics, Efficient algorithm, General Mathematics, Quantifier elimination, 0102 computer and information sciences, Computer Science::Computational Geometry, 01 natural sciences, Mathematics

Abstract

In 2015, Guth proved that if $\EuScript{S}$ is a collection of $n$ $g$-dimensional semialgebraic sets in ${\mathbb{R}}^d$ and if $D\geq 1$ is an integer, then there is a $d$-variate polynomial $P$ ...

Published

2021

37. Solving quantified linear arithmetic by counterexample-guided instantiation.

Author

Reynolds, Andrew, King, Tim, and Kuncak, Viktor

Subjects

SATISFIABILITY (Computer science), TRANSFER functions, BOOLEAN algebra, SKOLEM function, ARITHMETIC

Abstract

This paper presents a framework to derive instantiation-based decision procedures for satisfiability of quantified formulas in first-order theories, including its correctness, implementation, and evaluation. Using this framework we derive decision procedures for linear real arithmetic and linear integer arithmetic formulas with one quantifier alternation. We discuss extensions of these techniques for handling mixed real and integer arithmetic, and to formulas with arbitrary quantifier alternations. For the latter, we use a novel strategy that handles quantified formulas that are not in prenex normal form, which has advantages with respect to existing approaches. All of these techniques can be integrated within the solving architecture used by typical SMT solvers. Experimental results on standardized benchmarks from model checking, static analysis, and synthesis show that our implementation in the SMT solver cvc4 outperforms existing tools for quantified linear arithmetic. [ABSTRACT FROM AUTHOR]

Published

2017

38. Application of quantifier elimination to mixed-mode fracture criteria in crack problems.

Author

Ioakimidis, Nikolaos

Subjects

*FRACTURE mechanics, *SURFACE cracks, *TANGENTIAL force, *STRAINS & stresses (Mechanics), *DERIVATIVES (Mathematics)

Abstract

Several criteria for mixed-mode fracture in crack problems are based on the maximum of a quantity quite frequently related to stress components. This quantity should not reach a critical value. Computationally, this approach requires the use of the first and the second derivatives of the above quantity although frequently the use of the second derivative is omitted because of the necessary complicated computations. Therefore, mathematically, the determination of the maximum of the quantity of interest is not assured when the classical approach is used without the second derivative. Here a completely different and more rigorous approach is proposed. The present approach is based on symbolic computations and makes use of modern quantifier elimination algorithms implemented in the computer algebra system Mathematica. The maximum tangential stress criterion, the generalized maximum tangential stress criterion (with a T-stress term), the T-criterion and the modified maximum energy release rate criterion are used for the illustration of the present new approach in the mode I/II case. Beyond the conditions of fracture initiation, the determination of the fracture angle is also studied. The mode I/III case is also considered in brief. The present approach completely avoids differentiations, similarly the necessity of a distinction between maxima and minima, always leads to a global (absolute) and not to a local (relative) maximum and frequently to closed-form formulae and automatically makes a distinction of cases in the final formula whenever this is necessary. Moreover, its use is easy and direct and the maximum of the quantity of interest is always assured. [ABSTRACT FROM AUTHOR]

Published

2017

39. Elementary recursive quantifier elimination based on Thom encoding and sign determination.

Author

Perrucci, Daniel and Roy, Marie-Françoise

Subjects

*ELIMINATION (Mathematics), *ALGORITHMS, *CODING theory, *ALGEBRA, *SEMIALGEBRAIC sets

Abstract

We describe a new quantifier elimination algorithm for real closed fields based on Thom encoding and sign determination. The complexity of this algorithm is elementary recursive and its proof of correctness is completely algebraic. In particular, the notion of connected components of semialgebraic sets is not used. [ABSTRACT FROM AUTHOR]

Published

2017

40. Distance structures for generalized metric spaces.

Author

Conant, Gabriel

Subjects

*METRIC spaces, *ORDERED algebraic structures, *BINARY operations, *INVARIANTS (Mathematics), *MONOIDS

Abstract

Let R = ( R , ⊕ , ≤ , 0 ) be an algebraic structure, where ⊕ is a commutative binary operation with identity 0, and ≤ is a translation-invariant total order with least element 0. Given a distinguished subset S ⊆ R , we define the natural notion of a “generalized” R -metric space, with distances in S . We study such metric spaces as first-order structures in a relational language consisting of a distance inequality for each element of S . We first construct an ordered additive structure S ⁎ on the space of quantifier-free 2-types consistent with the axioms of R -metric spaces with distances in S , and show that, if A is an R -metric space with distances in S , then any model of Th ( A ) logically inherits a canonical S ⁎ -metric. Our primary application of this framework concerns countable, universal, and homogeneous metric spaces, obtained as generalizations of the rational Urysohn space. We adapt previous work of Delhommé, Laflamme, Pouzet, and Sauer to fully characterize the existence of such spaces. We then fix a countable totally ordered commutative monoid R , with least element 0, and consider U R , the countable Urysohn space over R . We show that quantifier elimination for Th ( U R ) is characterized by continuity of addition in R ⁎ , which can be expressed as a first-order sentence of R in the language of ordered monoids. Finally, we analyze an example of Casanovas and Wagner in this context. [ABSTRACT FROM AUTHOR]

Published

2017

41. The asymptotic couple of the field of logarithmic transseries.

Author

Gehret, Allen

Subjects

*ASYMPTOTIC expansions, *LOGARITHMIC functions, *LOGARITHMIC integrals, *QUANTIFIERS (Linguistics), *DISCRETE groups

Abstract

The derivation on the differential-valued field T log of logarithmic transseries induces on its value group Γ log a certain map ψ . The structure ( Γ log , ψ ) is a divisible asymptotic couple. We prove that the theory T log = Th ( Γ log , ψ ) admits elimination of quantifiers in a natural first-order language. All models ( Γ , ψ ) of T log have an important discrete subset Ψ : = ψ ( Γ ∖ { 0 } ) . We give explicit descriptions of all definable functions on Ψ and prove that Ψ is stably embedded in Γ. [ABSTRACT FROM AUTHOR]

Published

2017

42. Fully incremental cylindrical algebraic decomposition

Author

Erika Ábrahám and Gereon Kremer

Subjects

Algebra and Number Theory, Backtracking, Computation, 010102 general mathematics, 010103 numerical & computational mathematics, Solver, Data structure, 01 natural sciences, Satisfiability, Cylindrical algebraic decomposition, Algebra, Computational Mathematics, Satisfiability modulo theories, ComputingMethodologies_SYMBOLICANDALGEBRAICMANIPULATION, Quantifier elimination, 0101 mathematics, Mathematics

Abstract

Collins introduced the cylindrical algebraic decomposition method for eliminating quantifiers in real arithmetic formulas. In our work we use this method for satisfiability checking in satisfiability modulo theories solver technologies, and tune it by trying to avoid some computation steps that are needed for quantifier elimination but not for satisfiability checking. We further propose novel data structures and adapt the method to work incrementally and to support backtracking. We verify the effectiveness experimentally by comparing different versions of the cylindrical algebraic decomposition used within a state-of-the-art satisfiability modulo theories solver.

Published

2020

43. A complete and terminating approach to linear integer solving

Author

Thomas Sturm, Martin Bromberger, Christoph Weidenbach, Max-Planck-Institut für Informatik (MPII), Max-Planck-Gesellschaft, Modeling and Verification of Distributed Algorithms and Systems (VERIDIS), Max-Planck-Gesellschaft-Max-Planck-Gesellschaft-Inria Nancy - Grand Est, Institut National de Recherche en Informatique et en Automatique (Inria)-Institut National de Recherche en Informatique et en Automatique (Inria)-Department of Formal Methods (LORIA - FM), Laboratoire Lorrain de Recherche en Informatique et ses Applications (LORIA), Institut National de Recherche en Informatique et en Automatique (Inria)-Université de Lorraine (UL)-Centre National de la Recherche Scientifique (CNRS)-Institut National de Recherche en Informatique et en Automatique (Inria)-Université de Lorraine (UL)-Centre National de la Recherche Scientifique (CNRS)-Laboratoire Lorrain de Recherche en Informatique et ses Applications (LORIA), Institut National de Recherche en Informatique et en Automatique (Inria)-Université de Lorraine (UL)-Centre National de la Recherche Scientifique (CNRS)-Université de Lorraine (UL)-Centre National de la Recherche Scientifique (CNRS), Centre National de la Recherche Scientifique (CNRS), Proof-oriented development of computer-based systems (MOSEL), Department of Formal Methods (LORIA - FM), Institut National de Recherche en Informatique et en Automatique (Inria)-Université de Lorraine (UL)-Centre National de la Recherche Scientifique (CNRS)-Institut National de Recherche en Informatique et en Automatique (Inria)-Université de Lorraine (UL)-Centre National de la Recherche Scientifique (CNRS), Saarland University [Saarbrücken], Institut National de Recherche en Informatique et en Automatique (Inria)-Université de Lorraine (UL)-Centre National de la Recherche Scientifique (CNRS)-Institut National de Recherche en Informatique et en Automatique (Inria)-Université de Lorraine (UL)-Centre National de la Recherche Scientifique (CNRS)-Inria Nancy - Grand Est, Institut National de Recherche en Informatique et en Automatique (Inria)-Max-Planck-Institut für Informatik (MPII), Max-Planck-Gesellschaft-Max-Planck-Gesellschaft, and Universität des Saarlandes [Saarbrücken]

Subjects

Normalization property, CDCL, Algebra and Number Theory, 010102 general mathematics, Linear arithmetic, [INFO.INFO-LO]Computer Science [cs]/Logic in Computer Science [cs.LO], Context (language use), 010103 numerical & computational mathematics, Integer arithmetic, Space (mathematics), 01 natural sciences, Satisfiability, Decidability, Algebra, Computational Mathematics, SMT, Linear programming, Quantifier elimination, Order (group theory), SAT, [INFO]Computer Science [cs], 0101 mathematics, Integer (computer science), Mathematics

Abstract

International audience; We consider feasibility of linear integer problems in the context of verification systems such as SMT solvers or theorem provers. Although satisfiability of linear integer problems is decidable, many state-of-the-art implementations neglect termination in favor of efficiency. We present thecalculus CutSat++ that is sound, terminating, complete, and leaves enough space for model assumptions and simplification rules in order to be efficient in practice. CutSat++ combines model-driven reasoning and quantifier elimination to the feasibility of linear integer problems.

Published

2020

44. Higher-Order Quantifier Elimination, Counter Simulations and Fault-Tolerant Systems

Author

Elena Pagani and Silvio Ghilardi

Subjects

Programming language, Computer science, Computation, 020207 software engineering, Fault tolerance, 02 engineering and technology, computer.software_genre, Higher-order logic, Computational Theory and Mathematics, Artificial Intelligence, Order (exchange), Quantifier elimination, 0202 electrical engineering, electronic engineering, information engineering, 020201 artificial intelligence & image processing, computer, Software

Abstract

We develop quantifier elimination procedures for fragments of higher order logic arising from the formalization of distributed systems (especially of fault-tolerant ones). Such procedures can be used in symbolic manipulations like the computation of pre/post images and of projections. We show in particular that our procedures are quite effective in producing counter abstractions that can be model-checked using standard SMT technology. In fact, very often in the current literature verification tasks for distributed systems are accomplished via counter abstractions. Such abstractions can sometimes be justified via simulations and bisimulations. In this work, we supply logical foundations to this practice, by our technique for second order quantifier elimination. We implemented our procedure for a simplified (but still expressive) subfragment and we showed that our method is able to successfully handle verification benchmarks from various sources with interesting performances.

Published

2020

45. Eigenvalue Placement by Quantifier Elimination - the Static Output Feedback Problem

Author

Klaus Röbenack and Rick Voßwinkel

Subjects

Output feedback, 0209 industrial biotechnology, Information Systems and Management, Observer (quantum physics), Computer science, Contrast (statistics), 0102 computer and information sciences, 02 engineering and technology, Management Science and Operations Research, 01 natural sciences, Theoretical Computer Science, 020901 industrial engineering & automation, 010201 computation theory & mathematics, Control theory, Quantifier elimination, Computer Science (miscellaneous), Computer Vision and Pattern Recognition, State (computer science), Electrical and Electronic Engineering, Focus (optics), Software, Eigenvalues and eigenvectors

Abstract

This contribution deals with the static output feedback problem of linear time-invariant systems. This is still an area of active research, in contrast to the observer-based state feedback problem, which has been solved decades ago. We consider the formulation and solution of static output feedback design problems using quantifier elimination techniques. Stabilization as well as more specified eigenvalue placement scenarios are the focus of the paper.

Published

2020

46. Challenges of Trajectory Planning with Integrator Models on Curved Roads

Author

Olaf Stursberg and Jan Eilbrecht

Subjects

0209 industrial biotechnology, Mathematical optimization, Computer science, 020208 electrical & electronic engineering, Context (language use), 02 engineering and technology, Type (model theory), Network topology, Computer Science::Robotics, Nonlinear system, 020901 industrial engineering & automation, Control and Systems Engineering, Trajectory planning, Integrator, Quantifier elimination, 0202 electrical engineering, electronic engineering, information engineering, Focus (optics)

Abstract

In the context of trajectory planning for autonomous vehicles, a widely used vehicle model relies on linear integrator dynamics. We consider planning with this model type, with a focus on the requirement to account for curved road topologies. As our analysis reveals, this generally gives rise to non-convex, coupled constraints on the vehicle’s states and inputs, which impedes computationally efficient planning. We propose a method to resolve this issue by modification of the non-convex constraints. This modification is based on inner approximations of sub-level sets of nonlinear functions, which are obtained by quantifier elimination. The efficacy of the method is demonstrated in two example scenarios.

Published

2020

47. [Untitled]

Author

Pavel Hrubes

Subjects

Discrete mathematics, Computational Theory and Mathematics, Quantifier elimination, Boolean function, Theoretical Computer Science, Mathematics

Published

2020

48. A layered algorithm for quantifier elimination from linear modular constraints.

Author

John, Ajith and Chakraborty, Supratik

Subjects

LINEAR algebra, VECTORS (Calculus), MODULAR fields (Algebra), ARBITRARY constants, COMPUTER graphics

Abstract

Linear equalities, disequalities and inequalities on fixed-width bit-vectors, collectively called linear modular constraints, form an important fragment of the theory of fixed-width bit-vectors. We present a practically efficient and bit-precise algorithm for quantifier elimination from conjunctions of linear modular constraints. Our algorithm uses a layered approach, whereby sound but incomplete and cheaper layers are invoked first, and expensive but complete layers are called only when required. We then extend this algorithm to work with arbitrary Boolean combinations of linear modular constraints as well. Experiments on an extensive set of benchmarks demonstrate that our techniques significantly outperform alternative quantifier elimination techniques based on bit-blasting and linear integer arithmetic. [ABSTRACT FROM AUTHOR]

Published

2016

49. Cylindrical algebraic decomposition using local projections.

Author

Strzeboński, Adam

Subjects

*CYLINDRIC algebras, *MATHEMATICAL decomposition, *ALGORITHMS, *SEMIALGEBRAIC sets, *MATHEMATICAL formulas, *MATHEMATICAL inequalities

Abstract

We present an algorithm which computes a cylindrical algebraic decomposition of a semialgebraic set using projection sets computed for each cell separately. Such local projection sets can be significantly smaller than the global projection set used by the Cylindrical Algebraic Decomposition (CAD) algorithm. This leads to reduction in the number of cells the algorithm needs to construct. A restricted version of the algorithm was introduced in Strzeboński (2014) . The full version presented here can be applied to quantified formulas and makes use of equational constraints. We give an empirical comparison of our algorithm and the classical CAD algorithm. [ABSTRACT FROM AUTHOR]

Published

2016

50. Quantifier elimination by cylindrical algebraic decomposition based on regular chains.

Author

Chen, Changbo and Moreno Maza, Marc

Subjects

*MATHEMATICAL decomposition, *MATHEMATICAL regularization, *ALGORITHMS, *ELIMINATION (Mathematics), *MATHEMATICAL complexes, *POLYNOMIALS

Abstract

A quantifier elimination algorithm by cylindrical algebraic decomposition based on regular chains is presented. The main idea is to refine a complex cylindrical tree until the signs of polynomials appearing in the tree are sufficient to distinguish the true and false cells. We report an implementation of our algorithm in the RegularChains library in Maple and illustrate its effectiveness by examples. [ABSTRACT FROM AUTHOR]

Published

2016