In a previous paper [6] the Bergman projection in D = A ∪ B, the union of domains A, B ⊂ CN, was described by alternating projections procedure. It was shown that when N = 1, and A, B are two halfplanes, the procedure can be carried out by explicit analytic calculations. In the present paper we show that the same is true for A = {|Re z| < π} and B = {Re z > 0}. In this case the calculations are more involved, and an essential use is made of L2-theorems of Paley–Wiener type due to T. Genchev, M. Dzrbasjan and W. Martirosjan. Of central importance is an operator W which maps f(z) onto . We show that for every g ∈ L2H(B) the sequence Wng (n = 1, 2, …) converges to zero locally uniformly in B.