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Holomorphic Imbeddings of Symmetric Domains into a Siegel Space

I. Satake
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I. Satake: University of Chicago, Department of Mathematics

A chapter in Proceedings of the Conference on Complex Analysis, 1965, pp 40-48 from Springer

Abstract: Abstract A symmetric domain is a bounded domain in C N which becomes a symmetric Riemannian space with respect to its Bergman metric. For a symmetric domain π’Ÿ, we denote by G the connected component of the group of all analytic automorphisms of π’Ÿ (or, what is the same, that of the group of all isometries of π’Ÿ onto itself) with its natural topology and by K the isotropy subgroup of G at an (arbitrary) point z 0 ∈ π’Ÿ. Then, as is well-known ([1], [2]), G is a (connected) semi-simple Lie group of non-compact type with center reduced to the identity, K is a maximal compact subgroup of G and π’Ÿ is identified with the coset-space G/K. A symmetric domain π’Ÿ is decomposed uniquely into the direct product π’Ÿ 1 Γ— β‹― Γ— π’Ÿ S of irreducible symmetric domains π’Ÿ i (i. e. the domains which cannot be decomposed any further) corresponding to the direct decomposition G 1 Γ— β‹― Γ— G s of G into simple components. Irreducible symmetric domains have been classified completely by E. Cartas [1] into four main series (I), (II), (III) and (IV) of classical domains (see no 3 below) and two exceptional domains corresponding to the simple Lie groups of type (E 6) and (E 7).

Keywords: Irreducible Representation; Abelian Variety; Hermitian Form; Symmetric Domain; Isotropy Subgroup (search for similar items in EconPapers)
Date: 1965
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DOI: 10.1007/978-3-642-48016-4_5

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