A Pointwise Bound for a Holomorphic Function which is Square-Integrable with Respect to an Exponential Density Function
Abstract
Let φ be a real-valued smooth function on C satisfying 0 φ M for some M 0. We consider the space of all holomorphic functions which are square-integrable with respect to the measure e-φ(z) dz. In this paper, a pointwise bound for any function in this space is established. We show that there exists a constant K depending only on M such that |f(z)|2 Keφ(z)\|f\|2 for any f in this space and for any complex number z.
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