Сибирский федеральный университет 
Тип публикации: статья из журнала
Год издания: 2020
Идентификатор DOI: 10.13108/2020-12-3-44
Ключевые слова: bochner-martinelli kernel, holomorphic continuation, morera boundary condition
Аннотация: The problem on holomorphic continuation of functions defined on the boundary of a domain into this domain is topical in the multi-dimensional complex analysis. It has a long history beginning from works by Poincaré and Hartogs. In the present work we consider continuous functions defined on a boundary of a bounded domain D in Cn, n > 1, and possessing a generalized Morera property along the family of complex straight lines intersecting the germ of a real analytic manifold of codimension 2 lying away of the boundary of the domain. The Morera property is the vanishing of the integral of this function over the intersection of the boundary of the domain with the complex curve. We show that such function possesses a holomorphic continuation into the domain D. For functions of one complex variable, the Morera property obviously does not imply the existence of holomorphic continuation. This is why such problem can be considered only in the multi-dimensional case (n?> 1). © Kytmanov A.M., Myslivets S.G. 2020.
Издание
Журнал: Ufa Mathematical Journal
Выпуск журнала: Vol. 12, Is. 3
Номера страниц: 44-49
ISSN журнала: 23040122
Издатель: Institute of Mathematics with Computing Centre
Персоны
- Kytmanov A.M. (Siberian Fed Univ, Svobodny Av 79, Krasnoyarsk 660041, Russia)
- Myslivets S.G. (Siberian Fed Univ, Svobodny Av 79, Krasnoyarsk 660041, Russia)
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