Indecomposable (1,3)-Groups and a matrix problem
DOI10.1007/S10587-013-0020-6zbMath1281.20063OpenAlexW1979685315MaRDI QIDQ2864410
Ebru Solak, Otto Mutzbauer, Adolf Mader, David M. Arnold
Publication date: 6 December 2013
Published in: Czechoslovak Mathematical Journal (Search for Journal in Brave)
Full work available at URL: http://hdl.handle.net/10338.dmlcz/143315
subgroups of finite indexindecomposable groupsalmost completely decomposable groupsregulating subgroupsfinite rank torsion-free Abelian groupsnear-isomorphism classes
Representations of quivers and partially ordered sets (16G20) Extensions of abelian groups (20K35) Canonical forms, reductions, classification (15A21) Direct sums, direct products, etc. for abelian groups (20K25) Subgroups of abelian groups (20K27) Torsion-free groups, finite rank (20K15)
Related Items (7)
Cites Work
- Almost completely decomposable groups and unbounded representation type.
- A survey of canonical forms and invariants for unitary similarity
- \((1,2)\)-groups with \(p^3\)-regulator quotient.
- Nearly isomorphic torsion free abelian groups
- Matrix problems and categories of matrices
- Application of modules over a dyad for the classification of finite \(p\)-groups possessing an Abelian subgroup of index \(p\) and of pairs of mutually annihilating operators
- Abelian groups and representations of finite partially ordered sets
- Canonical matrices for linear matrix problems
- Representations of finite partially ordered sets over commutative Artinian uniserial rings.
- Generalized almost completely decomposable groups.
- Almost Completely Decomposable Torsion Free Abelian Groups
- BR-groups with critical type set (1, 2)
- Representations of Finite Posets Over Discrete Valuation Rings
- FINITELY GENERATED MODULES OVER A DYAD OF TWO LOCAL DEDEKIND RINGS, AND FINITE GROUPS WITH AN ABELIAN NORMAL DIVISOR OF INDEXp.
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