Peak-Bone-Mass
发表于 2025-3-26 21:26:25
R. Leitsmann,F. Bechstedt,F. Ortmanneld-theoretical preparations. Section 2 develops the connections between the algebraic subgroups of an algebraic group . and the sub Lie algebras of .(.) fully, under the assumption that the base field be of characteristic 0. This assumption is retained in Section 3, which is devoted to reducing, as
全部逛商店
发表于 2025-3-27 02:23:36
R. Leitsmann,F. Bechstedt,F. Ortmannically closed and that the group is irreducible. In the presence of these assumptions, the solvable groups are characterized by the property that their simple polynomial modules are 1-dimensional. This is the Lie-Kolehin Theorem, given here as Theorem 1.1.
instructive
发表于 2025-3-27 07:48:41
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贸易
发表于 2025-3-27 10:41:44
Conductance of Correlated Nanostructurese, equipped with a superstructure of functions. Section 1 introduces pre-varieties, a preliminary notion slightly more general than that of a variety, which is convenient for developing the basic technical results concerning varieties. Section 2 is devoted to products of prevarieties and the notion
尖酸一点
发表于 2025-3-27 17:01:28
Ping Wang,Jochen Fröhlich,Ulrich Maasalgebra than has been used up to now. Thus, Section 1 establishes Noether’s Normalization Theorem, which is used for reducing some of the required ideal theoretical considerations to the situation of an ordinary polynomial algebra. The remaining results of Section 1 concern the connections between t
铁砧
发表于 2025-3-27 20:51:09
Ping Wang,Jochen Fröhlich,Ulrich Maasver an algebraically closed field ., and . is an algebraic subgroup of .. The main task for this chapter is the construction of an appropriate variety structure on ./.. In Section 1, it appears that [.(.)]. is a suitable candidate for the field .(./.) of rational functions. Starting with this field,
一大群
发表于 2025-3-27 22:06:14
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PRISE
发表于 2025-3-28 02:52:07
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必死
发表于 2025-3-28 08:42:52
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无瑕疵
发表于 2025-3-28 12:28:05
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