Results 51 to 60 of about 11,845 (129)
Let g be a simple complex Lie algebra and let e be a nilpotent element of g. It was conjectured by Premet in [P07i] that the finite W-algebra U(g; e) admits a 1-dimensional representation, and further work [L10, P08] has reduced this conjecture to the ...
Ubly, Glenn
core
Lipschitz Carnot-Carathéodory Structures and their Limits. [PDF]
Antonelli G +2 more
europepmc +1 more source
The cobordism group of homology cylinders [PDF]
Garoufalidis and Levine introduced the homology cobordism group of homology cylinders over a surface. This group can be regarded as an enlargement of the mapping class group.
Friedl, Stefan +5 more
core +1 more source
Universality in long-distance geometry and quantum complexity. [PDF]
Brown AR +3 more
europepmc +1 more source
Applications of Lie methods to computations with polycyclic groups
In this thesis we demonstrate the algorithmic usefulness of the so-called Mal'cev correspondence for computations with infinite polycyclic groups.
Assmann, Björn
core
A nilpotent non abelian group code
The paper reports an example for a nilpotent group code which is not monomially equivalent to some abelian group ...
Nebe, G., Schäfer, A.
core +2 more sources
The pro-nilpotent group topology on a free group [PDF]
In this paper, we study the pro-nilpotent group topology on a free group. First we describe the closure of the product of finitely many finitely generated subgroups of a free group in the pro-nilpotent group topology and then present an algorithm to ...
Shahzamanian, MH +5 more
core +1 more source
The free lattice-ordered group over a nilpotent group
We show that the free lattice-ordered group over a finitely generated torsionfree nilpotent group is l l -solvable of some finite rank.
Michael R. Darnel
core +1 more source
Inference for a Large Directed Acyclic Graph with Unspecified Interventions. [PDF]
Li C, Shen X, Pan W.
europepmc +1 more source
Harmonic functions on nilpotent groups
For a probability measure σ on a locally compact group G which is not supported on any proper closed subgroup, an element F of L∞(G) is called σ-harmonic if (latin small letter esh) F(st)dσ(t) = F(s) for almost all s in G.
Johnson BE
core

