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Attempts to extend our previous work using the octonions to describe fundamental particles lead naturally to the consideration of a particular real, noncompact form of the exceptional Lie group $E_{6}$ , and of its subgroups. We are therefore led to a description of $E_{6}$ in terms of $3 \times 3$ octonionic matrices, generalizing previous results in the $2 \times 2$ case. Our treatment naturally includes a description of several important subgroups of $E_{6}$ , notably $G_{2}$ , $F_{4}$ , and (the double cover of) $S O (9, 1)$ . An interpretation of the actions...

Odd symplectic groups.

Robert A. Proctor (1988)

Inventiones mathematicae

Oids, finite sums and the structure of the Stone-Cech compactification of a discrete semigroup.

T. Papazyan (1991)

Semigroup forum

Old and New on S1(2).

Karl H. Hofmann, Joachim Hilgert (1986)

Manuscripta mathematica

On 3-symmetric Riemannian spaces of solvable type

Aleksej Tralle (1989)

Commentationes Mathematicae Universitatis Carolinae

On a centralizer result of Hunter's (correspondence between Karl Heinrich Hofmann and Robert P. Hunter).

K.H. Hofmann, R.P. Hunter (1974)

Semigroup forum

On a Class of KMS States for the Unitary Group U (oo).

Serban Stratila, Dan Voiculescu (1978)

Mathematische Annalen

On a Class of Topological Groups.

Patrick B. Chen, Ta-Sun Wu (1984)

Mathematische Annalen

On a class of weakly almost periodic mappings.

J.P. Troallic, G. Hansel (1990)

Semigroup forum

On a covering group theorem and its applications.

Grigorian, S.A., Gumerov, R.N. (2002)

Lobachevskii Journal of Mathematics

On a diffeological group realization of certain generalized symmetrizable Kac-Moody Lie algebras.

Leslie, Joshua (2003)

Journal of Lie Theory

On a general coarea inequality and applications.

Magnani, Valentino (2002)

Annales Academiae Scientiarum Fennicae. Mathematica

On a Generalised Open-Mapping Theorem

J.W. Baker (1967)

Mathematische Annalen

On a generalization of Abelian sequential groups

Saak S. Gabriyelyan (2013)

Fundamenta Mathematicae

Let (G,τ) be a Hausdorff Abelian topological group. It is called an s-group (resp. a bs-group) if there is a set S of sequences in G such that τ is the finest Hausdorff (resp. precompact) group topology on G in which every sequence of S converges to zero. Characterizations of Abelian s- and bs-groups are given. If (G,τ) is a maximally almost periodic (MAP) Abelian s-group, then its Pontryagin dual group ${(G, τ)}^{\land}$ is a dense -closed subgroup of the compact group ${(G_{d})}^{\land}$ , where $G_{d}$ is the group G with the discrete...

On a Limit Theorem of Measures.

S.T.L. Choy (1971)

Mathematica Scandinavica

On a matched pair of Lie groups for the $κ$ -Poincaré in 2-dimensions.

Sitarz, Andrzej, Zgliczyński, Piotr (1996)

Mathematical Physics Electronic Journal [electronic only]

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