Dependency Pairs Termination in Dependent Type Theory Modulo Rewriting

Higher-Order Superposition for Dependent Types

Roberto Virga

January 1995

In this paper we extend the higher-order critical pair criterion, as described in [9], to the LF fra...

Termination of Associative-Commutative Rewriting using Dependency Pairs Criteria

Kusakari Keiichirou
Claude Marché
Xavier Urbain

January 2002

In 1997, Arts and Giesl proposed new criteria for proving termination of rewriting, based on the so...

Refinement Types as Higher Order Dependency Pairs

Roux, Cody

January 2011

Refinement types are a well-studied manner of performing in-depth analysis on functional programs. T...

Dependency Pairs Termination in Dependent Type Theory Modulo Rewriting

Genestier, Guillaume
Hermant, Olivier

January 2019

Dependency pairs are a key concept at the core of modern automated termination provers for first-ord...

Dependency Pairs Termination in Dependent Type Theory Modulo Rewriting

Blanqui, Frédéric
Genestier, Guillaume
Hermant, Olivier

June 2019

International audienceDependency pairs are a key concept at the core of modern automated termination...

Improving dependency pairs

Jürgen Giesl
René Thiemann
Peter Schneider-kamp
Stephan Falke

January 2003

Abstract. The dependency pair approach is one of the most powerful techniques for termination and in...

Mechanizing dependency pairs

Jürgen Giesl
René Thiemann
Peter Schneider-Kamp
Stephan Falke

January 2003

The dependency pair approach [2, 13, 14] is a powerful technique for automated termination and inner...

Improving dependency pairs

Rene ́ Thiemann
Peter Schneider-kamp
Stephan Falke

January 2003

Abstract. The dependency pair approach is one of the most powerful techniques for termination and in...

Proving and disproving termination of higher-order functions

Jürgen Giesl
René Thiemann
Peter Schneider-kamp

January 2005

Abstract. The dependency pair technique is a powerful modular method for automated termination proof...

Higher-order dependency pairs

Blanqui, Frédéric

August 2006

International audienceArts and Giesl proved that the termination of a first-order rewrite system can...

Harnessing First Order Termination Provers Using Higher Order Dependency Pairs

Fuhs, C.
Kop, C.L.M.

January 2011

Many functional programs and higher order term rewrite systems contain, besides higher order rules, ...

Proving and disproving termination of higher-order functions

Jürgen Giesl
René Thiemann
Peter Schneider-kamp

January 2005

The dependency pair technique is a powerful modular method for automated termination proofs of term ...

Proving Termination of Higher-Order Rewrite Systems based on Strongly Computable Dependency Pair Method

February 2008

Abstract The higher-order rewrite systems (HRS for short) are a computation model of functional prog...

Refinement Types as Higher-Order Dependency Pairs

Roux, Cody

January 2011

Refinement types are a well-studied manner of performing in-depth analysis on functional programs. T...

Proving Termination of Higher-Order Rewrite Systems based on Strongly Computable Dependency Pair Method

February 2008

Abstract The higher-order rewrite systems (HRS for short) are a computation model of functional prog...

Higher-Order Superposition for Dependent Types

Roberto Virga

January 1995

In this paper we extend the higher-order critical pair criterion, as described in [9], to the LF fra...

Termination of Associative-Commutative Rewriting using Dependency Pairs Criteria

Kusakari Keiichirou
Claude Marché
Xavier Urbain

January 2002

In 1997, Arts and Giesl proposed new criteria for proving termination of rewriting, based on the so...

Refinement Types as Higher Order Dependency Pairs

Roux, Cody

January 2011

Refinement types are a well-studied manner of performing in-depth analysis on functional programs. T...

Dependency Pairs Termination in Dependent Type Theory Modulo Rewriting

Genestier, Guillaume
Hermant, Olivier

January 2019

Dependency pairs are a key concept at the core of modern automated termination provers for first-ord...

Dependency Pairs Termination in Dependent Type Theory Modulo Rewriting

Blanqui, Frédéric
Genestier, Guillaume
Hermant, Olivier

June 2019

International audienceDependency pairs are a key concept at the core of modern automated termination...

Improving dependency pairs

Jürgen Giesl
René Thiemann
Peter Schneider-kamp
Stephan Falke

January 2003

Abstract. The dependency pair approach is one of the most powerful techniques for termination and in...

Mechanizing dependency pairs

Jürgen Giesl
René Thiemann
Peter Schneider-Kamp
Stephan Falke

January 2003

The dependency pair approach [2, 13, 14] is a powerful technique for automated termination and inner...

Improving dependency pairs

Rene ́ Thiemann
Peter Schneider-kamp
Stephan Falke

January 2003

Abstract. The dependency pair approach is one of the most powerful techniques for termination and in...

Proving and disproving termination of higher-order functions

Jürgen Giesl
René Thiemann
Peter Schneider-kamp

January 2005

Abstract. The dependency pair technique is a powerful modular method for automated termination proof...

Higher-order dependency pairs

Blanqui, Frédéric

August 2006

International audienceArts and Giesl proved that the termination of a first-order rewrite system can...

Harnessing First Order Termination Provers Using Higher Order Dependency Pairs

Fuhs, C.
Kop, C.L.M.

January 2011

Many functional programs and higher order term rewrite systems contain, besides higher order rules, ...

Proving and disproving termination of higher-order functions

Jürgen Giesl
René Thiemann
Peter Schneider-kamp

January 2005

The dependency pair technique is a powerful modular method for automated termination proofs of term ...

Proving Termination of Higher-Order Rewrite Systems based on Strongly Computable Dependency Pair Method

February 2008

Abstract The higher-order rewrite systems (HRS for short) are a computation model of functional prog...

Refinement Types as Higher-Order Dependency Pairs

Roux, Cody

January 2011

Refinement types are a well-studied manner of performing in-depth analysis on functional programs. T...

Proving Termination of Higher-Order Rewrite Systems based on Strongly Computable Dependency Pair Method

February 2008

Abstract The higher-order rewrite systems (HRS for short) are a computation model of functional prog...

Higher-Order Superposition for Dependent Types

Roberto Virga

January 1995

In this paper we extend the higher-order critical pair criterion, as described in [9], to the LF fra...

Termination of Associative-Commutative Rewriting using Dependency Pairs Criteria

Kusakari Keiichirou
Claude Marché
Xavier Urbain

January 2002

In 1997, Arts and Giesl proposed new criteria for proving termination of rewriting, based on the so...

Refinement Types as Higher Order Dependency Pairs

Roux, Cody

January 2011

Refinement types are a well-studied manner of performing in-depth analysis on functional programs. T...

Dependency Pairs Termination in Dependent Type Theory Modulo Rewriting

Abstract

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Dependency Pairs Termination in Dependent Type Theory Modulo Rewriting

Abstract

Extracted data

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