On Asymptotic Gate Complexity and Depth of Reversible Circuits With Additional Memory

Abstract

The reversible logic can be used in various research areas, e.g. quantum computation, cryptography and signal processing. In the paper we study reversible logic circuits with additional inputs, which consist of NOT, CNOT and C2NOT gates. We consider a set F(n,q) of all transformations Bn Bn that can be realized by reversible circuits with (n+q) inputs. An analogue of Lupanov's method for the synthesis of reversible logic circuits with additional inputs is described. We prove upper asymptotic bounds for the Shannon gate complexity function L(n,q) and the depth function D(n,q) in case of q > 0: L(n,q0) 2n if q0 n 2n-o(n) and D(n,q1) 3n if q1 2n.