Order Algebras as Models of Linear Logic

The starting point of the present study is the interpretation of intuitionistic linear logic in Petri nets proposed by U. Engberg and G. Winskel. We show that several categories of order algebras provide equivalent interpretations of this logic, and identify the category of the so called strongly coherent quantales arising in these interpretations. The equivalence of the interpretations is intimately related to the categorical facts that the aforementioned categories are connected with each other via adjunctions, and the compositions of the connecting functors with co-domain the category of strongly coherent quantales are dense. In particular, each quantale canonically induces a Petri net, and this association gives rise to an adjunction between the category of quantales and a category whose objects are all Petri nets.

[1]  R. P. Dilworth,et al.  Algebraic theory of lattices , 1973 .

[2]  Wolfgang Reisig,et al.  Petri Nets , 1985, EATCS Monographs on Theoretical Computer Science.

[3]  Jean-Yves Girard,et al.  Linear Logic , 1987, Theor. Comput. Sci..

[4]  José Meseguer,et al.  Petri nets are monoids: a new algebraic foundation for net theory , 1988, [1988] Proceedings. Third Annual Information Symposium on Logic in Computer Science.

[5]  M. Nivat Fiftieth volume of theoretical computer science , 1988 .

[6]  José Meseguer,et al.  From Petri Nets to Linear Logic , 1989, Category Theory and Computer Science.

[7]  Carl A. Gunter,et al.  Nets as Tensor Theories , 1989 .

[8]  Glynn Winskel,et al.  Petri Nets as Models of Linear Logic , 1990, CAAP.

[9]  David N. Yetter,et al.  Quantales and (noncommutative) linear logic , 1990, Journal of Symbolic Logic.

[10]  José Meseguer,et al.  Petri Nets Are Monoids , 1990, Inf. Comput..

[11]  K. I. Rosenthal Quantales and their applications , 1990 .

[12]  J. Lilius On the Compositionality and Analysis of Algebraic High-level Nets on the Compositionality and Analysis of Algebraic High-level Nets , 1991 .

[13]  Narciso Martí-Oliet,et al.  From Petri nets to linear logic , 1989, Mathematical Structures in Computer Science.

[14]  A. Troelstra Lectures on linear logic , 1992 .

[15]  Glynn Winskel,et al.  Completeness Results for Linear Logic on Petri Nets , 1993, Ann. Pure Appl. Log..

[16]  J. van Leeuwen,et al.  Theoretical Computer Science , 2003, Lecture Notes in Computer Science.