Title :
Proof nets and Boolean circuits
Author :
Terui, Kazushige
Author_Institution :
Nat. Inst. of Informatics, Japan
Abstract :
We study the relationship between proof nets for mutiplicative linear logic (with unbounded fan-in logical connectives) and Boolean circuits. We give simulations of each other in the style of the proofs-as-programs correspondence; proof nets correspond to Boolean circuits and cut-elimination corresponds to evaluation. The depth of a proof net is defined to be the maximum logical depth of cut formulas in it, and it is shown that every unbounded fan-in Boolean circuit of depth n, possibly with stC0NN2 gates, is polynomially simulated by a proof net of depth O(n) and vice versa. Here, stC0NN2 stands for st-connectivity gates for undirected graphs of degree 2. Let APNi be the class of languages for which there is a polynomial size, logi-depth family of proof nets. We then have APNi = ACi(stCONN2).
Keywords :
Boolean functions; circuit simulation; computational complexity; logic circuits; theorem proving; Boolean circuits; cut-elimination; mutiplicative linear logic; proof nets; proofs-as-programs correspondence; st-connectivity gates; unbounded fan-in logical connectives; undirected graphs; Boolean functions; Circuit simulation; Computational complexity; Computational modeling; Computer science; Concurrent computing; Informatics; Logic circuits; Polynomials; Turing machines;
Conference_Titel :
Logic in Computer Science, 2004. Proceedings of the 19th Annual IEEE Symposium on
Print_ISBN :
0-7695-2192-4
DOI :
10.1109/LICS.2004.1319612
