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On generalized smooth groups
Published/Copyright:
May 12, 2006
Abstract
A maximal chain in a finite lattice L is called smooth if any two intervals of the same length are isomorphic. We call a lattice L totally smooth if all maximal chains of L are smooth. The main concept in this paper is that of a generalized smooth group, that is, a group G such that [G/H] is totally smooth for every subgroup H of G of prime order. The purpose of this paper is to determine the structure of generalized smooth groups.
Received: 2004-04-26
Revised: 2004-06-23
Published Online: 2006-05-12
Published in Print: 2006-01-26
© Walter de Gruyter
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Articles in the same Issue
- Linear independence of L-functions
- Infinite interacting diffusion particles I: Equilibrium process and its scaling limit
- Every smooth p-adic Lie group admits a compatible analytic structure
- Mixed modules of finite torsion-free rank over a discrete valuation domain
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- E-locally cyclic abelian groups and maximal near-rings of mappings
- A note on Fourier coefficients of cusp forms on GLn
- Non-proper affine actions of the holonomy group of a punctured torus
- The linearisation map in algebraic K-theory
- The homotopy type of BG2Λ for some small matrix groups G
