Automated reasoning and nonclassical logics: Introduction

1. Anderson A. R. and Belnap N. D.Jr.,Entailment: The Logic of Relevance and Necessity, Vol. 1, Princeton UP, Princeton, New Jersey (1975).

   Google Scholar 

2. Girard J. Y., ‘Linear logic’,Theoret. Comput. Sci.,50, 1–102 (1987).

   Article  Google Scholar 

3. Kneale W. and Kneale M.,The Development of Logic, OUP, London, 1962.

   Google Scholar 

4. Lusk, E. L., McCune, W. W., and Slaney, J. K., ‘ROO — a parallel theorem prover‘, inInformal Proc. of the Internat. Workshop onParallel Processing for AI in Conjunction with IJCAI-91 (eds. L. N. Kanal and C. B. Suttner), Sydney, Australia, pp. 110–116 (dy1991).

5. McRobbie M. A., Meyer R. K., and Thistlewaite P. B., ‘Towards efficient knowledge-based automated theorem proving for non-standard logics’, inProc. 9th Internat. Conf. Automated Deduction (eds. E.Lusk and R.Overbeek), Lecture Notes in Computer Science, Vol. 310, Springer, Berlin, pp. 197–217 (1988).

   Google Scholar 

6. Meyer R. K., ‘RI — The bounds of finitude’,Z. Math. Logik Grundlag. Math. 16, 385–387 (1970).

   Google Scholar 

7. Morgan C., ‘Methods for automated theorem proving in nonclassical logics’,IEEE Trans. Comput.,C-25, 852–862 (1976).

   Google Scholar 

8. Ohlbach H.-J., ‘Resolution calculus for modal logics’, SEKI Report SR-88-08, Artificial Intelligence Laboratories, Fachbereich Informatik, Universitaet Kaiserslautern, Germany (1988).

   Google Scholar 

9. Slaney J. K., ‘3088 varieties: A solution to the Ackermann constant problem’,J. Symbolic Logic 50, 487–501 (1984).

   Google Scholar 

10. Thistlewaite P. B., McRobbie M. A., and Meyer R. K.,Automated Theorem-Proving in Non-Classical Logics, Pitman, London, and Wiley, New York (1988).

    Google Scholar 

11. Wallen L. A., ‘Matrix proof methods for modal logics’,IJCAI 87: Proc. Tenth Internat. Joint Conf. Artificial Intelligence, Vols. 1 and 2, Morgan Kaufmann, Los Altos (1987).

    Google Scholar 

Download references