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Unitary equivalence of multiplication operators on the Bergman spaces of polygons

Part of: Individual linear operators as elements of algebraic systems Series expansions

Published online by Cambridge University Press:  05 March 2021

Hansong Huang  and
Dechao Zheng
Hansong Huang*
Affiliation:
School of Mathematics, East China University of Science and Technology, Shanghai200237, China
Dechao Zheng
Affiliation:
Center of Mathematics, Chongqing University, Chongqing 401331, China and Department of Mathematics, Vanderbilt University, Nashville, TN37240, USA e-mail: [email protected]
*
e-mail: [email protected]
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Abstract

In this paper, we will show that the unitary equivalence of two multiplication operators on the Bergman spaces on polygons depends on the geometry of the polygon.

Keywords

Polygonsmultiplication operatorsunitary equivalence

MSC classification

Primary: 47C15: Operators in $C^*$- or von Neumann algebras
Secondary: 30B40: Analytic continuation
Type
Article
Information
Canadian Mathematical Bulletin , Volume 65 , Issue 1 , March 2022 , pp. 123 - 133
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Copyright
© Canadian Mathematical Society 2021

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Footnotes

This work was partially supported by NSFC (11271387 and 12071134).

References

Cowen, C., The commutant of an analytic Toeplitz operator. Trans. Amer. Math. Soc. 239(1978), 131.CrossRefGoogle Scholar
Cowen, C., Finite Blaschke products as compositions of other finite Blaschke products. http://www.math.iupui.edu/~ccowen/Downloads/49BlaschkeProds.pdf Google Scholar
Cowen, C., Commutants of finite Blaschke product multiplication operators on Bergman spaces. http://www.math.iupui.edu/~ccowen/Talks/Wabash1405.pdf Google Scholar
Garcia, S. R., Mashreghi, J., and Ross, W., Finite Blaschke products and their connections. Springer, New York, 2018.CrossRefGoogle Scholar
Garnett, J. and Marshall, D., Harmonic measure. New Mathematical Monographs, 2, Cambridge University Press, Cambridge, MA, 2005.CrossRefGoogle Scholar
Guo, K. and Huang, H., On multiplication operators of the Bergman space: similarity, unitary equivalence and reducing subspaces. J. Operator Theory 65(2011), 355378.Google Scholar
Guo, K. and Huang, H., Multiplication operators on the Bergman space. Lecture Notes in Mathematics, 2145, Springer, Heidelberg, Germany, 2015.CrossRefGoogle Scholar
Huang, H. and Zheng, D., Multiplication operators on the Bergman spaces of polygons. J. Math. Anal. Appl. 456(2017), 10491061.CrossRefGoogle Scholar
Milnor, J., Dynamics in one complex variable. Annals of Mathematics Studies, 160, Princeton University Press, Princeton, NJ, 2006.Google Scholar
Rudin, W., Function theory in polydiscs. Benjamin, New York, 1969.Google Scholar
Rudin, W., Real and complex analysis. 3rd ed., McGraw-Hill, New York, 1987.Google Scholar
Sun, S., On unitary equivalence of multiplication operators on Bergman space. Northeastern Math. J. 1(1985), 213222.Google Scholar
Thomson, J., The commutant of a class of analytic Toeplitz operators. Amer. J. Math. 99(1977), 522529.CrossRefGoogle Scholar