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The Bergman-Shilov boundary for subfamil...

Pawlaschyk, Thomas...

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The Bergman-Shilov boundary for subfamilies of q-plurisubharmonic functions by Pawlaschyk, Thomas ( Author )

Content Provider	Lemonjar Open Access
Publisher	N.A
Publication Date	31-10-2014
Summary	We introduce a notion of the Bergman-Shilov (or Shilov) boundary for some subclasses of upper-semicontinuous functions on a compact Hausdorff space. It is by definition the smallest closed subset of the given space on which all functions of that subclass attain their maximum. For certain subclasses with simple structure one can show the existence and uniqueness of the Shilov boundary. Then we provide its relation to the set of peak points and establish Bishop-type theorems. As an application we obtain a generalization of Bychkov's theorem which gives a geometric characterization of the Shilov boundary for q-plurisubharmonic functions on convex bounded domains. In the case of bounded pesudoconvex domains with smooth boundary we also show that some parts of the Shilov boundary for q-plurisubharmonic functions are foliated by q-dimensional complex submanifolds.
ISBN	-
Item Type	Article
File Type	pdf
File Size	36.88 KB
Language	English
Subjects	-
Unlimited	MYR 0.01
Total read	-
URL	http://arxiv.org/abs/1411.0033

Citation

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AMA 11th EditionReferences

Pawlaschyk, Thomas. The Bergman-Shilov boundary for subfamilies of q-plurisubharmonic functions. N.A. October 31, 2014. Accessed October 01, 2025. https://online.provdatabase.com/cite/18112

APA 7th EditionReferences

Pawlaschyk, Thomas. (2014). The Bergman-Shilov boundary for subfamilies of q-plurisubharmonic functions. N.A. https://online.provdatabase.com/cite/18112

Chicago 17th EditionReferences

Pawlaschyk, Thomas. The Bergman-Shilov boundary for subfamilies of q-plurisubharmonic functions. N.A. 2014. https://online.provdatabase.com/cite/18112

HarvardReferences

Pawlaschyk, Thomas. (2014). The Bergman-Shilov boundary for subfamilies of q-plurisubharmonic functions. [Online]. N.A. Available from: https://online.provdatabase.com/cite/18112. (Accessed 01 October 2025).

Harvard AustraliaReferences

Pawlaschyk, Thomas, 2014, The Bergman-Shilov boundary for subfamilies of q-plurisubharmonic functions, N.A, viewed 01 October 2025, <https://online.provdatabase.com/cite/18112>

MLA 9th EditionWorks Cited

Pawlaschyk, Thomas. The Bergman-Shilov boundary for subfamilies of q-plurisubharmonic functions. N.A, 2014. PROV Database, https://online.provdatabase.com/cite/18112.

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