Ptime canonization for two variables with counting

We consider infinitary logic with two variable symbols and counting quantifiers, C/sup 2/, and its intersection with PTIME on finite relational structures. In particular we exhibit a PTIME canonization procedure for finite relational structures which provides unique representatives up to equivalence in C/sup 2/. As a consequence we obtain a recursive presentation for the class of all those queries on arbitrary finite relational structures which are both PTIME and definable in C/sup 2/. The proof renders a succinct normal form representation of this non-trivial semantically defined fragment of PTIME. Through specializations of the proof techniques similar results apply with respect to the logic L/sup 2/, infinitary logic with two variable symbols, itself.

[1]  László Babai,et al.  Canonical labelling of graphs in linear average time , 1979, 20th Annual Symposium on Foundations of Computer Science (sfcs 1979).

[2]  Martin Otto,et al.  Inductive Definability with Counting on Finite Structures , 1992, CSL.

[3]  Bruno Poizat Deux Ou Trois Choses Que je Sais de Ln , 1982, J. Symb. Log..

[4]  K. Jon Barwise,et al.  On Moschovakis closure ordinals , 1977, Journal of Symbolic Logic.

[5]  Neil Immerman,et al.  Relational Queries Computable in Polynomial Time , 1986, Inf. Control..

[6]  Serge Abiteboul,et al.  Generic Computation and its complexity , 1991, STOC '91.

[7]  Phokion G. Kolaitis,et al.  Infinitary Logics and 0-1 Laws , 1992, Inf. Comput..

[8]  Martin Otto,et al.  The expressive power of fixed-point logic with counting , 1996, Journal of Symbolic Logic.

[9]  E. Lander,et al.  Describing Graphs: A First-Order Approach to Graph Canonization , 1990 .

[10]  Neil Immerman Upper and lower bounds for first order expressibility , 1980, 21st Annual Symposium on Foundations of Computer Science (sfcs 1980).

[11]  Michael Mortimer,et al.  On languages with two variables , 1975, Math. Log. Q..

[12]  Anuj Dawary,et al.  Innnitary Logic and Inductive Deenability over Finite Structures , 1995 .