Some results on Korenblum's maximum principle

Let Ap(D) (1⩽p<∞) be the Bergman space over the open unit disk D in the complex plane. For p⩾1, let cp be the largest value of c for which Korenblum's maximum principle holds. In this paper we obtain a new lower bound on cp: cp⩾0.23917. We also improve the lower bound on c2 up to 0.28185.