-free  -groups

doi:10.1285/i15900932v30n1supplp55

$L_{10}$ -free $\{p,q\}$ -groups

Roland Schmidt

Abstract

If $L$ is a lattice, a group is called $L$ -free if its subgroup lattice has no sublattice isomorphic to $L$ . It is easy to see that $L_{10}$ , the subgroup lattice of the dihedral group of order 8, is the largest lattice $L$ such that every finite $L$ -free $p$ -group is modular. In this paper we continue the study of $L_{10}$ -free groups. We determine all finite $L_{10}$ -free $\{p,q\}$ -groups for primes $p$ and $q$ , except those of order $2^{\alpha}3^{\beta}$ with normal Sylow $3$ -subgroup

DOI Code: 10.1285/i15900932v30n1supplp55

Keywords: subgroup lattice; sublattice; finite group; modular Sylow subgroup

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Note di Matematica

-free -groups

Abstract

$L_{10}$ -free $\{p,q\}$ -groups