Radial growth, Lipschitz and Dirichlet spaces on solutions to the Yukawa equation
Abstract
In this paper, we investigate some properties to solutions f to the Yukawa PDE: f=λ f in the unit ball Bn of Cn, where λ is a nonnegative constant. First, we prove that the answer to an open problem of Girela and Pel\'aez, concerning such solutions, is positive. Then we study relationships on such solutions between the bounded mean oscillation and Lipschitz-type spaces. At last, we discuss Dirichlet-type energy integrals on such solutions in the unit ball of Cn and give an application.
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