Results 171 to 180 of about 36,092 (214)
On Morphisms Between Connected Commutative Algebraic Groups over a Field of Characteristic 0. [PDF]
Transform GroupsDill GA.
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Rank-expanding satellites, Whitehead doubles, and Heegaard Floer homology. [PDF]
J TopolDai I +3 more
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Arithmetic fundamental lemma for the spherical Hecke algebra. [PDF]
Manuscr MathLi C, Rapoport M, Zhang W.
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State-of-the-art local correlation methods enable affordable gold standard quantum chemistry for up to hundreds of atoms. [PDF]
Chem SciNagy PR.
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Divisibility Properties of Groups Rings over Torsion-free Abelian Groups
, 1999 Byung Gyun Kang
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On Torsion-Free Abelian k-Groups
Proceedings of the American Mathematical Society, 1987A height sequence s is a function on primes p with values \(s_ p\) natural numbers or \(\infty\). The height sequence \(| x|\) of an element x in a torsion-free abelian group G is defined by \(| x|_ p=height\) of x at p. For a height sequence s, \(G(s)=\{x\in G:| x| \geq s\}\), \(G(ps)=\{x\in G(s):| x|_ p\geq s_ p+1\}\), \(G(s^*)=\{x\in G(s):\sum_{p}(|
Dugas, Manfred, Rangaswamy, K. M.
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ENDOPRIMAL TORSION-FREE SEPARABLE ABELIAN GROUPS
Journal of Algebra and Its Applications, 2004We give a characterization for the groups in the title in terms of the graph structure of the critical types occurring in the group. Moreover, we give an example of arbitrarily large endoprimal indecomposable groups.
Göbel, R. +3 more
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Tight subgroups in torsion-free Abelian groups
Israel Journal of Mathematics, 2003The paper deals with ``tight subgroups'' of torsion-free Abelian groups, namely those subgroups that are maximal with respect to being completely decomposable. Tight subgroups were first studied by \textit{K. Benabdallah}, \textit{A. Mader} and \textit{M. A. Ould-Beddi} [J. Algebra 225, No.
Ould-Beddi, Mohamed A. +1 more
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Direct Decompositions of Torsion-Free Abelian Groups
Lobachevskii Journal of Mathematics, 2020zbMATH Open Web Interface contents unavailable due to conflicting licenses.
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Torsion-free Abelian Groups, Valuations and Twisted Group Rings
Canadian Mathematical Bulletin, 1988AbstractAnderson and Ohm have introduced valuations of monoid rings k[Γ] where k is a field and Γ a cancellative torsion-free commutative monoid. We study the residue class fields in question and solve a problem concerning the pure transcendence of the residue fields.
Bastos, Gervasio G., Viswanathan, T. M.
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