Quantum random walk revisited

Abstract

In the framework of the symmetric Fock space over L²(R₊), the details of the approximation of the four fundamental quantum stochastic increments by the four appropriate spin-matrices are studied. Then this result is used to prove the strong convergence of a quantum random walk as a map from an initial algebra A into A⊗B(Fock(L²(R₊))) to a *-homomorphic quantum stochastic flow.