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Acta Mathematica Academiae Paedagogicae Nyíregyháziensis, Vol. 21, No. 1, pp. 71-77 (2005)
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# Compact subsets of spaces of holomorphic functions

## Georg Schneider

Universitat Wien

**Abstract:**
In [26] compactness criteria in function spaces are investigated for general coorbit spaces. These methods cannot be easily adopted for the spaces $F_m$ and the Bergman-spaces $B^2(\Omega)$. We will be able to derive a generalization of the above mentioned result to the spaces $F_m$ and $B^2(\Omega)$. Furthermore we will be able to derive a sufficient compactness conditions for subsets $A$ of the Fock-space in terms of the Taylor-expansion of the functions $f\in A$.

We will introduce increasing norm-spaces, that are a natural generalization of the above mentioned spaces. The main result will be proven for the spaces $F_m$ and $B^2(\Omega)$ will follow from this result.

**Keywords:** Fock-space, Bergman-space, Increasing norm-space

**Classification (MSC2000):** 46B50

**Full text of the article:**

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© 2005 ELibM and
FIZ Karlsruhe / Zentralblatt MATH
for the EMIS Electronic Edition
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