Complex Analysis and Operator Theory

, Volume 3, Issue 2, pp 471–499 | Cite as

Compact Hankel Forms on Planar Domains

Article
First Online:

Abstract.

A Hankel form on a Hilbert function space is a bounded, symmetric, bilinear form [., .] satisfying [fx, y] = [x, fy] for a class of multipliers f. We prove analogs of Weyl–Horn and Ky Fan inequalities for compact Hankel forms, and apply them to estimate the related eigenvalues, both for Hardy–Smirnov and Bergman spaces norms associated to multiply connected planar domains. In the case of the unit disk, we investigate the asymptotic of some measures constructed by eigenfunctions of Hankel operators with certain Markov functions as symbols.

Keywords.

Bilinear symmetric form singular number meromorphic approximation rational approximation 

Mathematics Subject Classification (2000).

Primary 41A20 Secondary 30E10, 47B35 
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Copyright information

© Birkhäuser Verlag Basel/Switzerland 2008

Authors and Affiliations

  1. 1.Department of Mathematics and StatisticsUniversity of South AlabamaMobileUSA
  2. 2.Department of MathematicsUniversity of California at Santa BarbaraSanta BarbaraUSA

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