Singular Degenerations of Lie Supergroups of Type $D(2,1;a)$
Kenji Ioharaa,
Fabio Gavarinib a Univ Lyon, Université Claude Bernard Lyon 1, CNRS UMR 5208, Institut Camille Jordan, 43 Boulevard du 11 Novembre 1918, F 69622 Villeurbanne Cedex, France
b Dipartimento di Matematica, Università di Roma ''Tor Vergata'', Via della ricerca scientifica 1, I-00133 Roma, Italy
Аннотация:
The complex Lie superalgebras
$\mathfrak{g}$ of type
$D(2,1;a)$ – also denoted by
$\mathfrak{osp}(4,2;a) $ – are usually considered for “non-singular” values of the parameter
$a$, for which they are simple. In this paper we introduce five suitable integral forms of
$\mathfrak{g}$, that are well-defined at singular values too, giving rise to “singular specializations” that are no longer simple: this extends the family of
simple objects of type
$D(2,1;a)$ in five different ways. The resulting five families coincide for general values of
$ a$, but are different at “singular” ones: here they provide non-simple Lie superalgebras, whose structure we describe explicitly. We also perform the parallel construction for complex Lie supergroups and describe their singular specializations (or “degenerations”) at singular values of
$a$. Although one may work with a single complex parameter
$a$, in order to stress the overall
$\mathfrak{S}_3$-symmetry of the whole situation, we shall work (following Kaplansky) with a two-dimensional parameter
$\sigma = (\sigma_1,\sigma_2,\sigma_3)$ ranging in the complex affine plane
$\sigma_1 + \sigma_2 + \sigma_3 = 0$.
Ключевые слова:
Lie superalgebras; Lie supergroups; singular degenerations; contractions.
MSC: 14A22;
17B20;
13D10 Поступила: 31 октября 2017 г.; в окончательном варианте
11 декабря 2018 г.; опубликована
31 декабря 2018 г.
Язык публикации: английский
DOI:
10.3842/SIGMA.2018.137