Characterizing Algebraic Invariants by Differential Radical Invariants

Ghorbal, Khalil; Platzer, André

doi:10.1007/978-3-642-54862-8_19

Cited by 48 publications

(98 citation statements)

References 27 publications

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“…The proof is in the companion report [12]. When the evolution domain constraints are dropped (H = True) and r = 1 (one equation), one recovers exactly the statement of [11,Theorem 2] which characterizes invariance of atomic equations. Intuitively, Theorem 2 says that on the invariant algebraic set, all higher-order Lie derivatives of each polynomial h i must vanish.…”

Section: Characterizing Invariance Of Conjunctive Equationsmentioning

confidence: 70%

“…Using Theorem 2, the differential radical invariant proof rule DRI [11] generalizes to conjunctions of equations with evolution domain constraints as follows:…”

Section: Characterizing Invariance Of Conjunctive Equationsmentioning

confidence: 99%

“…For similar techniques used to automatically generate invariant algebraic sets we refer the reader to the discussion in [11].…”

Section: Related Workmentioning

confidence: 99%

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Invariance of Conjunctions of Polynomial Equalities for Algebraic Differential Equations

2014

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In this paper we seek to provide greater automation for formal deductive verification tools working with continuous and hybrid dynamical systems. We present an efficient procedure to check invariance of conjunctions of polynomial equalities under the flow of polynomial ordinary differential equations. The procedure is based on a necessary and sufficient condition that characterizes invariant conjunctions of polynomial equalities. We contrast this approach to an alternative one which combines fast and sufficient (but not necessary) conditions using differential cuts for soundly restricting the system evolution domain.

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Section: Characterizing Invariance Of Conjunctive Equationsmentioning

confidence: 70%

“…Using Theorem 2, the differential radical invariant proof rule DRI [11] generalizes to conjunctions of equations with evolution domain constraints as follows:…”

Section: Characterizing Invariance Of Conjunctive Equationsmentioning

confidence: 99%

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Invariance of Conjunctions of Polynomial Equalities for Algebraic Differential Equations

2014

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“…In [7], the authors extended the work of Matringe et al to generate real algebraic invariants of polynomial ODEs, giving a search procedure for the most general class of invariant sets that can be expressed using polynomial equations. The same procedure can be used to generate Darboux polynomials over the reals or over the complexes only by changing the underlying computational field.…”

Section: Automated Generation Of Decoupling Abstractionsmentioning

confidence: 99%

“…This relationship will enable us to exploit the efficient symbolic generation methods reported in [15,7]. We outline a procedure for constructing polynomials p such that L f (p) = G(p), where G ∈ R[X], from a list of automatically generated Darboux polynomials (up to some given degree).…”

Section: Automated Generation Of Decoupling Abstractionsmentioning

confidence: 99%

Decoupling Abstractions of Non-linear Ordinary Differential Equations

Sogokon

Ghorbal

Johnson

2016

FM 2016: Formal Methods

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Abstract. We investigate decoupling abstractions, by which we seek to simulate (i.e. abstract) a given system of ordinary differential equations (ODEs) by another system that features completely independent (i.e. uncoupled) sub-systems, which can be considered as separate systems in their own right. Beyond a purely mathematical interest as a tool for the qualitative analysis of ODEs, decoupling can be applied to verification problems arising in the fields of control and hybrid systems. Existing verification technology often scales poorly with dimension. Thus, reducing a verification problem to a number of independent verification problems for systems of smaller dimension may enable one to prove properties that are otherwise seen as too difficult. We show an interesting correspondence between Darboux polynomials and decoupling simulating abstractions of systems of polynomial ODEs and give a constructive procedure for automatically computing the latter.

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Pegasus: A Framework for Sound Continuous Invariant Generation

Sogokon

Mitsch

Tan

et al. 2019

Lecture Notes in Computer Science

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Continuous invariants are an important component in deductive verification of hybrid and continuous systems. Just like discrete invariants are used to reason about correctness in discrete systems without unrolling their loops forever, continuous invariants are used to reason about differential equations without having to solve them. Automatic generation of continuous invariants remains one of the biggest practical challenges to the automation of formal proofs of safety for hybrid systems. There are at present many disparate methods available for generating continuous invariants; however, this wealth of diverse techniques presents a number of challenges, with different methods having different strengths and weaknesses. To address some of these challenges, we develop Pegasus: an automatic continuous invariant generator which allows for combinations of various methods, and integrate it with the KeYmaera X theorem prover for hybrid systems. We describe some of the architectural aspects of this integration, comment on its methods and challenges, and present an experimental evaluation on a suite of benchmarks.1 An etymological note on naming conventions. The KeY [3] prover provided the foundation for developing KeYmaera [58], an interactive theorem prover for hybrid systems. The name KeYmaera was a pun on the Chimera, a hybrid monster from Classical Greek mythology. The tactic language of the new (aXiomatic) KeYmaera X prover [24] is called Bellerophon [23], after the hero who defeats the Chimera in the myth. In keeping with an established tradition, the invariant generation framework is called Pegasus because the aid of this winged horse was crucial to the hero Bellerophon in his feat.

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Characterizing Algebraic Invariants by Differential Radical Invariants

Cited by 48 publications

References 27 publications

Invariance of Conjunctions of Polynomial Equalities for Algebraic Differential Equations

Invariance of Conjunctions of Polynomial Equalities for Algebraic Differential Equations

Decoupling Abstractions of Non-linear Ordinary Differential Equations

Pegasus: A Framework for Sound Continuous Invariant Generation

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