ON QUASI-ENDOMORPHISM RINGS OF SOME STRONGLY INDECOMPOSABLE TORSION-FREE ABELIAN GROUPS OF RANK 4

By the quasi-endomorphism ring ℰ(G) of a torsion-free Abelian group G of finite rank we mean divisible hull of the endomorphism ring of the group. The elements of ℰ(G) is called quasiendomorphisms of G. Thus the quasi-endomorphisms of the group G is normal endomorphisms, which formally divided by non-zero integers.

In the paper it is considered quasi-endomorphism rings of class of strongly indecomposable torsion-free Abelian groups of rank 4 with one τ-adic relation, whose pseudo-socles have rank 1. Let τ = [(m_p)] be a fixed type, where m_p is a non-negative integer or the symbol ∞, indexed by elemets of P, the set of primes numbers. Denote by K_p = Zpm_p the residue class ring modulo p^mp in the case m_p < ∞ and ring of p-adic integers if m_p = ∞. We use the description of the groups from the above class up to quasi-isomorphism in terms of four-dimension over the field of rational numbers Q subspaces of algebra Q(τ) = Q⊗^∏︀_p∈pK_p. The existing relationship between the quasi-endomorphisms of a group G of this class and endomorphisms of the corresponding of this group subspace U of the algebra Q(τ) allows us to represent the quasi-endomorphisms of the group G in the form of a matrices of order 4 over the field of rational numbers.

In this paper, a classification of the quasi-endomorphism rings of strongly indecomposable torsion-free Abelian groups of rank 4 with one τ-adic relation, whose pseudosocles have rank 1, is obtained. It is proved that, up to isomorphism, there exist two algebras and one infinite series of algebras with rational parameter, which are realized as quasi-endomorphism rings of groups of this class.

1. Beaumont, R. A., Pierce, R.S. 1961, “Torsion free groups of rank two”, Mem. Amer. Math, vol. 38, pp. 1–41.

2. Reid, J. D. 1963, “On the ring of quasi-endomorphisms of a torsion-free group”, Topics in Abelian Groups, pp. 51–68.

3. Cherednikova, A. V. 1996, “Quasi-endomorphism rings of almost completely decomposable torsion-free Abelian groups of rank 3”, Abelian Groups and Modules, no. 13–14, pp. 237–242.

4. Cherednikova, A. V. 1996, “Quasi-endomorphism rings of decomposable torsion-free Abelian groups of rank 3”, Abelian Groups and Modules, no. 13–14, pp. 224–236.

5. Cherednikova, A. V. 1998, “Rings of quasi-endomorphisms of strongly indecomposable torsionfree abelian groups”, Math. Notes, vol. 63, no. 5–6, pp. 670–678.

6. Cherednikova, A. V. 2014, “Quasi-endomorphism rings of almost completely decomposable torsion-free Abelian groups of rank 4 with zero Jacobson radical”, J. Math. Sci., vol. 197, no. 5, pp. 698–702.

7. Cherednikova A. V. “Quasi-endomorphism rings of almost completely decomposable torsionfree Abelian groups of rank 4 that do not coincide with their pseudo-socles”, Math. Notes, vol. 97, no. 3–4, pp. 621–631.

8. Faticoni, T. G. 2007, “Direct Sum Decompositions of Tortion-Free Finite Rank Groups”, CRC Press, Boca Raton-London-New York. 338 pp.

9. Cherednikova, A. V. 2011, “Rings of quasi-endomorphisms of strongly indecomposable tortionfree abelian groups of rank 4 with pseudosocles of rank 3”, J. Math. Sci., vol. 177, no. 6, pp. 42–946.

10. Cherednikova, A. V. 2014 “Quasi-endomorphism rings of strongly indecomposable torsion-free Abelian groups of rank 4 with pseudosocles of rank 1”, J. Math. Sci., vol. 197, no. 5, pp. 703–707.

11. Fuchs, L. 1970. “Infinite Abelian grops”, Academic Press, vol. 1, New York–London. 290 pp.

12. Fuchs, L. 1973. “Infinite Abelian grops”, Academic Press, vol. 2, New York–London. 363 pp.

13. Fomin, A. A. 1986, “Pure free groups”, Abelian Groups and Modules, vol. 6, pp. 145–164. (Russian)

14. Kulikov, L. Y. 1964, “Groups of extensions of Abelian groups”, Proc. of the 4th All-Union Math. Conf. (Leningrad, 1961), vol. 2, Leningrad, pp. 9–11. (Russian)

15. Fomin, A. A. 1989, “Abelian groups with one tau-adic relation”, Algebra and Logic, vol. 28, no 1, pp. 83–104. (Russian)

16. Fomin, A. A. 1992, “Finite Rank Torsion-Free Abelian Groups up to Quasi-Isomorphism”, Doctorate thesis in the physico-mathematical sciences, Mosc. ped. gos. univ., Moscow. 260 pp. (Russian)

17. Richman, F. 1968, “A Class of Rank-2 Torsion Free Groups”, Studies on Abelian Groups, pp. 327– 333.

18.