L. Babai, Trading group theory for randomness, inProc. 17th Ann. ACM Symp. Theory of Computing, 1985, 421–429.
L. Babai, E-mail and the unexpected power of interaction, inProc. 5th Ann. IEEE Structures in Complexity Theory Conf., 1990, 30–44.
L. Babai and L. Fortnow, A characterization of #P by arithmetic straight line programs, inProc. 31st Ann. IEEE Symp. Foundations of Comp. Sci., 1990, 26–34.
L. Babai, L. Fortnow, andC. Lund, Nondeterministic exponential time has two-prover interactive protocols,Computational Complexity
1 (1991), 3–40. Extended Abstract inProc. 31st Ann. IEEE Symp. Foundations of Comp. Sci., 1990, 16–25.
L. Babai andS. Moran, Arthur-Merlin games: a randomized proof system, and a hierarchy of complexity classes,Journal Comp. Sys. Sci.
36 (1988), 254–276.
D. Beaver and J. Feigenbaum, Hiding instances in multioracle queries, inProc. 7th Symp. on Theoretical Aspects of Comp. Sci., Lecture Notes in Comp. Sci.
415 (1990), 37–48.
R. Beigel, J. Gill, and U. Hertrampf, Counting classes: thresholds, parity, mods, and fewness, inProc. 7th Symp. on Theoretical Aspects of Comp. Sci., Lecture Notes in Comp. Sci.
415 (1990), 49–57.
M. Blum, Designing programs that check their work, submitted toComm. of Assoc. Comput. Mach.
M. Blum and S. Kannan, Designing programs that check their work, inProc. 21st Ann. ACM Symp. Theory of Computing, 1989, 86–97.
M. Blum, M. Luby, and R. Rubinfeld, Self-testing and self-correcting programs, with applications to numerical programs, inProc. 22nd Ann. ACM Symp. Theory of Computing, 1990, 73–83.
R. Beigel, N. Reingold and D. Spielman, PP is Closed under Intersection, inProc. 23rd Ann. ACM Symp. Theory of Computing, 1991, to appear.
A. Chandra, D. Kozen, andL. Stockmeyer, Alternation,J. Assoc. Comput. Mach
28 (1981), 114–133.
J. Feigenbaum and L. Fortnow, On the random-self-reducibility of complete sets,University of Chicago Technical Report 90-22, 1990.
S. Fenner, L. Fortnow, and S. Kurtz, Gap-definable counting classes,University of Chicago Technical Report 90-32, 1990.
M. Garey and D. Johnson,Computers and Intractability: A Guide to the Theory of NP-Completeness, W.H. Freeman and Co., 1979
S. Goldwasser, S. Micali, andC. Rackoff, The knowledge complexity of interactive proofs,SIAM J. Comput.
18 (1989), 186–208. (Preliminary version appeared inProc. 18th Ann. ACM Symp. Theory of Computing, 1985, 291–304.)
S. Goldwasser and M. Sipser, Private coins versus public coins in interactive proof systems, inRandomness in Computation, S. Micali, ed.,Advances in Computing Research
5, JAI Press, 1989, 73–90.
O. Goldreich, S. Micali, and A. Wigderson, Proofs that yield nothing but their validity and a methodology of cryptographic protocol design, inProc. 27th Ann. IEEE Symp. Foundations of Comp. Sci., 1986, 174–187.
R. Lipton, New directions in testing, inProceedings of the DIMACS Workshop on Distributed Computing and Cryptography, 1989, to appear.
C. Lund, L. Fortnow, H. Karloff, and N. Nisan, Algebraic methods for interactive proof systems, inProc. 31st Ann. IEEE Symp. Foundations of Comp. Sci.,1990, 1–10.
A. A. Razborov, Lower bounds for the size of circuits of bounded depth with a complete basis including the logical addition function (in Russian),Matem. Zametki
41 (1981), 598–607. (English translation inMath. Notes of the Acad. Sci. USSR
U. Schöning, Probabilistic complexity classes and lowness, inProc. 2nd Ann. IEEE Structure in Complexity Theory Conf., 1987, 2–8.
A. Shamir, IP=PSPACE, inProc. 31st Ann. IEEE Symp. Foundations of Comp. Sci., 1990, 11–15.
R. Smolensky, Algebraic methods in the theory of lower bounds for Boolean circuit complexity, inProc. 19th Ann. ACM Symp. Theory of Computing, 1987, 77–82.
L. Stockmeyer, The Polynomial-time hierarchy,Theoretical Computer Science
3 (1977), 1–22.
S. Toda, On the computational powel of PP and ⊕P, inProc. 30th Ann. IEEE Symp. Foundations of Comp. Sci, 1989, 514–519.
L. Valiant, The complexity of computing the permanent,Theoretical Computer Science
8 (1979), 189–201.
L. Valiant andV. Vazirani, NP is as easy as detecting unique solutions,Theoretical Computer Science
47 (1986), 85–93.
H. Venkateswaran, Circuit definitions of nondeterministic complexity classes, inProc. 8th FST & TCS, Lecture Notes in Comp. Sci
338 (1988), 175–192.
V. Zankó, #P-completeness via many-one reductions,Internat. J. of Foundat. Comp. Sci., to appear