Convergence of the optimized delta expansion for the connected vacuum amplitude: Zero dimensions.

Recent proofs of the convergence of the linear delta expansion in zero and in one dimensions have been limited to the analogue of the vacuum generating functional in field theory. In zero dimensions it was shown that with an appropriate, N -dependent, choice of an optimizing parameter λ, which is an important feature of the method, the sequence of approximants ZN tends to Z with an error proportional to e −cN . In the present paper we establish the convergence of the linear delta expansion for the connected vacuum function W = lnZ. We show that with the same choice of λ the corresponding sequence WN tends to W with an error proportional to e −c √ N . The rate of convergence of the latter sequence is governed by the positions of the zeros of ZN . PACS numbers: 11.10.Jj, 12.38.Cy, 11.15.Tk.