论文信息 - Relation Algebra with Binders

Relation Algebra with Binders

The language of relation algebras is expanded with variables denoting individual elements in the domain and with the binder from hybrid logic. Every elementary property of binary relations is expressible in the resulting language, something which fails for the relation algebraic language. That the new language is natural for speaking about binary relations is indicated by the fact that both Craig’s Interpolation, and Beth’s Definability theorems hold for its set of validities. The paper contains a number of worked examples.

Maarten Marx | maarten marx

[1] Alfred Tarski,et al. Relational selves as self-affirmational resources , 2008 .

[2] Marcelo F. Frias,et al. Fork Algebras in Algebra, Logic and Computer Science , 2002, Fundam. Informaticae.

[3] A. Tarski,et al. A Formalization Of Set Theory Without Variables , 1987 .

[4] Patrick Blackburn,et al. Internalizing labelled deduction , 2000, J. Log. Comput..

[5] Maarten Marx,et al. Hybrid logics: characterization, interpolation and complexity , 2001, Journal of Symbolic Logic.

[6] Maarten Marx,et al. Amalgamation in relation algebras , 1998, The Journal of Symbolic Logic.

[7] Stephen Daniel Comer,et al. CLASSES WITHOUT THE AMALGAMATION PROPERTY , 1969 .

[8] Ian M. Hodkinson,et al. Relation Algebras with n-Dimensional Relational Bases , 2000, Ann. Pure Appl. Log..

[9] Patrick Blackburn,et al. Representation, Reasoning, and Relational Structures: a Hybrid Logic Manifesto , 2000, Log. J. IGPL.

[10] Ildikó Sain,et al. Beth's and Craig's properties via epimorphisms and amalgamation in algebraic logic , 1988, Algebraic Logic and Universal Algebra in Computer Science.

[11] J. Donald Monk. Review: Alfred Tarski and Steven Givant, A formalization of set theory without variables , 1989 .