On adjunction contexts and regular quasi-monads

The unit element of a ring A plays an important part in classical module theory. Its existence is equivalent to the adjointness of the free functor from the base category of abelian groups to the category of (unital) A-modules with the forgetful functor. Releasing the conditions on the “unit,” the relation between the free functor and the forgetful functor will also be changed. In this paper, we suggest how this situation may be handled.     

On representation varieties of free abelian groups

The reducibility of the representation variety of a free abelian group of finite rank in a semisimple non-simply connected algebraic group is proved. Irreducible components of the representation variety of a free abelian group of rank 2 in groups of type A_n are described.     

The reduced C1-algebra of the p-adic group GL(n)

The reduced C¹-algebra of the p-adic group GL(n) is Morita equivalent to an abelian C¹-algebra. The structure of this abelian C¹-algebra is described in terms of unramified unitary characters of Levi subgroups. The K-groups K₀ and K₁ are both free abelian of infinite rank. Generators are essentially parametrized by two items of Langlands data.     

Torsion-free constructive nilpotent <Emphasis Type="Italic">R</Emphasis><Subscript><Emphasis Type="Italic">p</Emphasis></Subscript>-groups

We consider a torsion-free nilpotent R _p -group, the p-rank of whose quotient by the commutant is equal to 1 and either the rank of the center by the commutant is infinite or the rank of the group by the commutant is finite. We prove that the group is constructivizable if and only if it is isomorphic to the central extension of some divisible torsion-free constructive abelian group by some torsion-free constructive abelian R _p -group with a computably enumerable basis and a computable system of commutators. We obtain similar criteria for groups of that type as well as divisible groups to be positively defined. We also obtain sufficient conditions for the constructivizability of positively defined groups.     

On Purity and Quasiequality of Abelian Groups

We study the Cohn purity in an abelian group regarded as a left module over its endomorphism ring. We prove that if a finite rank torsion-free abelian group G is quasiequal to a direct sum in which all summands are purely simple modules over their endomorphism rings then the module _E(G) G is purely semisimple. This theorem makes it possible to construct abelian groups of any finite rank which are purely semisimple over their endomorphism rings and it reduces the problem of endopure semisimplicity of abelian groups to the same problem in the class of strongly indecomposable abelian groups.     

Rank functions and K0 of regular rings

This paper is concerned with the existence and uniqueness of rank and pseudo-rank functions on a von Neumann regular ring R. The main technique used involves transferring hypotheses becomes a partially ordered abelian group. It is shown that the existence of a pseudo-rank function on R is equivalent to certain finiteness conditions on the matrix rings over R. As a corollary, necessary and sufficient conditions are obtained for the existence of a rank function on a simple regular ring. Uniqueness of a rank function is shown to be equivalent to certain comparability conditions on the principal right ideals of R. Other results concern the existence of enough pseudo-rank functions to distinguish nonzero ring elements from zero, or to distinguish between non-isomorphic principal right ideals.All rings in this paper are associative with unit (but usually noncommutative), and all modules are unital right modules. We use “regular” to mean “von Neumann regular”.The research of the first author was partially supported by National Science Foundation Grant No. GP-43029.     

A duality principle for groups

The duality principle for Gabor frames states that a Gabor sequence obtained by a time-frequency lattice is a frame for L²(Rd) if and only if the associated adjoint Gabor sequence is a Riesz sequence. We prove that this duality principle extends to any dual pairs of projective unitary representations of countable groups. We examine the existence problem of dual pairs and establish some connection with classification problems for II₁ factors. While in general such a pair may not exist for some groups, we show that such a dual pair always exists for every subrepresentation of the left regular unitary representation when G is an abelian infinite countable group or an amenable ICC group. For free groups with finitely many generators, the existence problem of such a dual pair is equivalent to the well-known problem about the classification of free group von Neumann algebras.     

Free and free abelian Euler-Satake characteristics of nonorientable 2-orbifolds

We compute the Γ-sectors and Γ-Euler-Satake characteristic of a closed, effective 2-dimensional orbifold Q where Γ is a free or free abelian group. Using this information, we determine a family of orbifolds such that the complete collection of Γ-Euler-Satake characteristics associated to free and free abelian groups determines the number and type of singular points of Q as well as the Euler characteristic of the underlying space. Additionally, we show that any collection of these groups whose Euler-Satake characteristics determine this information contains both free and free abelian groups of arbitrarily large rank. It follows that the collection of Euler-Satake characteristics associated to free and free abelian groups constitute a finer orbifold invariant than the collection of Euler-Satake characteristics associated to free groups or free abelian groups alone.     

Modules with absolute endomorphism rings

Eklof and Shelah [8] call an abelian group absolutely indecomposable if it is directly indecomposable in every generic extension of the universe. More generally, we say that an R-module is absolutely rigid if its endomorphism ring is just the ring of scalar multiplications by elements of R in every generic extension of the universe. In [8] it is proved that there do not exist absolutely rigid abelian groups of size ≥ κ(ω), where κ(ω) is the first ω-Erd?s cardinal (for its definition see the introduction). A similar result holds for rigid systems of abelian groups. On the other hand, recently Göbel and Shelah [15] proved that for modules of size < κ(ω) this phenomenon disappears. Their result on R _ω -modules (i.e. on R-modules with countably many distinguished submodules) that establishes the existence of ‘well-behaving’ fully rigid systems of abelian groups of large sizes < κ(ω) will be extended here to a large class of R-modules by proving the existence of modules of any sizes < κ(ω) with endomorphism rings which are absolute. In order to cover rings as general as possible, we utilize a method developed by Brenner, Butler and Corner (see [2, 3, 5]) to reduce the number of distinguished submodules required in the construction from ?₀ to five.We give several applications of our results. They include modules over domains with four pairwise comaximal prime elements, and modules over quasi-local rings whose completions contain at least five algebraically independent elements.     

An answer to Hirasaka and Muzychuk: Every p-Schur ring over Cp3 is Schurian

In Hirasaka and Muzychuk [An elementary abelian group of rank 4 is a CI-group, J. Combin. Theory Ser. A 94 (2) (2001) 339–362] the authors, in their analysis on Schur rings, pointed out that it is not known whether there exists a non-Schurian p-Schur ring over an elementary abelian p-group of rank 3. In this paper we prove that every p-Schur ring over an elementary abelian p-group of rank 3 is in fact Schurian.     

Epireflective subcategories of valuated groups

We show that the category of valuated groups has a topological forgetful functor to the category of abelian groups. This category is universal, that is, it is the bireflective hull of its T_o-objects, and properties of the (large) lattice of epireflective subcategories are contrasted with results obtained by T. Marny [7] for universal categories over the category of sets.     

On finite Alperin 2-groups with elementary abelian second commutants

By an Alperin group we mean a group in which the commutant of each 2-generated subgroup is cyclic. Alperin proved that if p is an odd prime then all finite p-groups with this property are metabelian. The today??s actual problem is the construction of examples of nonmetabelian finite Alperin 2-groups. Note that the author had given some examples of finite Alperin 2-groups with second commutants isomorphic to Z ₂ and Z ₄ and proved the existence of finite Alperin 2-groups with cyclic second commutants of however large order by appropriate examples. In this article the existence is proved of finite Alperin 2-groups with abelian second commutants of however large rank.     

Residual properties of free groups,II

In this paper we prove that if X is an infinite class of flnite simple classical groups, then F₂, the free group of rank 2, is residually X. This solves a special case of a question of W.Magnus. He conjectures that F₂ is residually X for any infinite class X of finite non-abelian simple groups.     

Interpolation categories for homology theories

For a homological functor from a triangulated category to an abelian category satisfying some technical assumptions, we construct a tower of interpolation categories. These are categories over which the functor factorizes and which capture more and more information according to the injective dimension of the images of the functor. The categories are obtained by using truncated versions of resolution model structures. Examples of functors fitting in our framework are given by every generalized homology theory represented by a ring spectrum satisfying the Adams-Atiyah condition. The constructions are closely related to the modified Adams spectral sequence and give a very conceptual approach to the associated moduli problem and obstruction theory. As an application, we establish an isomorphism between certain E(n)-local Picard groups and some Ext-groups.     

Finitely Generated Nilpotent Groups of Infinite Cyclic Commutator Subgroups

The aim of this paper is to determine the structure and to establish the isomorphic invariant of the finitely generated nilpotent group G of infinite cyclic commutator subgroup. Using the structure and invariant of the group which is the central extension of a cyclic group by a free abelian group of finite rank of infinite cyclic center, we provide a decomposition of G as the product of a generalized extraspecial Z-group and its center. By using techniques of lifting isomorphisms of abelian groups and equivalent normal form of the generalized extraspecial Z-groups, we finally obtain the structure and invariants of the group G.     

Uniqueness of orientation-preserving free actions of finite abelian groups on surfaces

Let G be a finite abelian group. We list all the cases where the topological equivalence class of orientation-preserving free G-actions on a closed surface is unique. Moreover, we obtain the classification of topological equivalence classes of orientation-preserving free actions of finite abelian groups of rank 2.     

On Torsion-Free Minimal Abelian Groups

ABSTRACT

An abelian group is said to be minimal if it is isomorphic to all its subgroups of finite index. In this article we show that torsion-free groups which are complete in their ?-adic topology or are of p-rank not greater than 1, for all primes p, are minimal. A criterion is found for the minimality of all finite rank and for large classes of infinite rank completely decomposable groups. Separable minimal groups are also considered.     

On Cellular Covers with Free Kernels

In this paper we show that every cotorsion-free and reduced abelian group of any finite rank (in particular, every free abelian group of finite rank) appears as the kernel of a cellular cover of some cotorsion-free abelian group of rank 2. This situation is the best possible in the sense that cotorsion-free abelian groups of rank 1 do not admit cellular covers with free kernel except for the trivial ones. This work is motivated by an example due to Buckner?CDugas, and recent results obtained by Fuchs?CG?bel, and G?bel?CRodríguez?CStrüngmann.     

Abelian Groups With Sufficiently <Emphasis Type="Italic">π</Emphasis>-Regular Endomorphism Ring

The notion of π-regular endomorphism ring of an abelian group, which generalizes the notion of regular endomorphism ring, was introduced in papers of L. Fuchs and K. Rangaswamy. They described periodic abelian groups with π-regular endomorphism ring and found necessary conditions for an abelian group to have π-regular endomorphism ring. In this paper, we study abelian groups with sufficiently π-regular endomorphism ring, which form a subclass of the class of abelian groups with π-regular endomorphism ring, and find necessary and sufficient conditions for an abelian group to have sufficiently π-regular endomorphism ring.     

Averaging sequences and abelian rank in amenable groups

We investigate the connection between the abelian rank of a countable amenable group and the existence of good averaging sequences (e.g., for the ergodic theorem). We show that if G is a group with finite abelian rank r(G), then 2^r(G) is a lower bound on the constant associated to a Tempel’man sequence, and if G is abelain there is a Tempel’man sequence in G with this constant. On the other hand, infinite rank precludes the existence of Tempel’man sequences and forces all tempered sequences to grow super-exponentially.