English

Korenblum-Type Extremal Problems in Bergman Spaces

Complex Variables 2015-07-24 v1

Abstract

We shall study non-linear extremal problems in Bergman space A2(D)\mathcal{A}^2(\mathbb{D}). We show the existence of the solution and that the extremal functions are bounded. Further, we shall discuss special cases for polynomials, investigate the properties of the solution and provide a bound for the solution. This problem is an equivalent formulation of B. Korenblum's conjecture, also known as Korenblum's Maximum Principle: for ff, gA2(D)g\in \mathcal{A}^2(\mathbb{D}), there is a constant cc, 0<c<10<c<1 such that if f(z)g(z)|f(z)|\leq |g(z)| for all zz such that c<z<1c<|z|<1, then f2g2\|f\|_2\leq \|g\|_2. The existence of such cc was proved by W. Hayman but the exact value of the best possible value of cc, denoted by κ\kappa, remains unknown.

Keywords

Cite

@article{arxiv.1507.06356,
  title  = {Korenblum-Type Extremal Problems in Bergman Spaces},
  author = {Pritha Chakraborty and Alexander Solynin},
  journal= {arXiv preprint arXiv:1507.06356},
  year   = {2015}
}
R2 v1 2026-06-22T10:16:50.397Z