Zobrazeno 1 - 10
of 58
pro vyhledávání: '"A. L. Onishchik"'
Autor:
Arkadi L. Onishchik
Publikováno v:
Lie Groups, Geometric Structures and Differential Equations — One Hundred Years after Sophus Lie, T. Morimoto, H. Sato and K. Yamaguchi, eds. (Tokyo: Mathematical Society of Japan, 2002)
We study the problem of lifting analytic actions of a Lie group $G$ to a non-split complex analytic supermanifold $(M, \mathcal{O})$ from its retract $(M, \mathcal{O}_{\mathrm{gr}})$. In the case when $G$ is compact (or complex reductive), two criter
Autor:
L. A. Aĭzenberg, A. B. Aleksandrov, P. V. Degtyar′, Ya. Yu. Gaĭdis, S. G. Gindikin, V. A. Kakichev, V. P. Khavin, G. M. Khenkin, B. I. Odvirko-Budko, A. L. Onishchik, S. I. Pinchuk, A. Yu. Pushnikov, V. V. Rabotin, L. I. Ronkin, A. Sadullaev, N. N. Tarkhanov, A. K. Tsikh, A. P. Yuzhakov
The papers in this volume range over a variety of topics in complex analysis, including holomorphic and entire functions, integral representations, the local theory of residues, complex manifolds, singularities, and CR structures.
Autor:
A. L. Onishchik, Elizaveta Vishnyakova
Publikováno v:
Transformation Groups
An important part of the classical theory of real or complex manifolds is the theory of (smooth, real analytic or complex analytic) vector bundles. With any vector bundle over a manifold (M,F) the sheaf of its (smooth, real analytic or complex analyt
Autor:
A. L. Onishchik, N. I. Ivanova
Publikováno v:
Journal of Mathematical Sciences. 152:1-60
Autor:
A. L. Onishchik, A. A. Serov
Publikováno v:
American Mathematical Society Translations: Series 2. :173-189
Autor:
A. L. Onishchik
Publikováno v:
Lie Groups and Symmetric Spaces. :273-306
Autor:
A. L. Onishchik
Publikováno v:
Journal of Mathematical Sciences. 90:2274-2286
Autor:
A L Onishchik, O V Platonova
Publikováno v:
Sbornik: Mathematics. 189:421-441
Autor:
A. L. Onishchik
Publikováno v:
Annals of Global Analysis and Geometry. 16:309-333
A construction is presented associating with any closed (1,1)-form ω on a complex manifold M a supermanifold, whose retract is the split supermanifold (M,Ω), where Ω is the sheaf of holomorphic forms on M. This supermanifold is non-split whenever
Autor:
A. L. Onishchik, V. A. Bunegina
Publikováno v:
Journal of Mathematical Sciences. 82:3503-3527