Research output: Contribution to journal › Article › peer-review
Divisible Rigid Groups. II. Stability, Saturation, and Elementary Submodels. / Myasnikov, A. G.; Romanovskii, N. S.
In: Algebra and Logic, Vol. 57, No. 1, 01.05.2018, p. 29-38.Research output: Contribution to journal › Article › peer-review
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TY - JOUR
T1 - Divisible Rigid Groups. II. Stability, Saturation, and Elementary Submodels
AU - Myasnikov, A. G.
AU - Romanovskii, N. S.
PY - 2018/5/1
Y1 - 2018/5/1
N2 - A group G is said to be rigid if it contains a normal series G = G1 > G2 > . . . > Gm > Gm+1 = 1, whose quotients Gi/Gi+1 are Abelian and, treated as right ℤ[G/Gi]- modules, are torsion-free. A rigid group G is divisible if elements of the quotient Gi/Gi+1 are divisible by nonzero elements of the ring ℤ[G/Gi]. Every rigid group is embedded in a divisible one. Previously, it was stated that the theory Im of divisible m-rigid groups is complete. Here, it is proved that this theory is ω-stable. Furthermore, we describe saturated models, study elementary submodels of an arbitrary model, and find a representation for a countable saturated model in the form of a limit group in the Fraïssé system of all finitely generated m-rigid groups. Also, it is proved that the theory Im admits quantifier elimination down to a Boolean combination of ∀∃-formulas.
AB - A group G is said to be rigid if it contains a normal series G = G1 > G2 > . . . > Gm > Gm+1 = 1, whose quotients Gi/Gi+1 are Abelian and, treated as right ℤ[G/Gi]- modules, are torsion-free. A rigid group G is divisible if elements of the quotient Gi/Gi+1 are divisible by nonzero elements of the ring ℤ[G/Gi]. Every rigid group is embedded in a divisible one. Previously, it was stated that the theory Im of divisible m-rigid groups is complete. Here, it is proved that this theory is ω-stable. Furthermore, we describe saturated models, study elementary submodels of an arbitrary model, and find a representation for a countable saturated model in the form of a limit group in the Fraïssé system of all finitely generated m-rigid groups. Also, it is proved that the theory Im admits quantifier elimination down to a Boolean combination of ∀∃-formulas.
KW - divisible rigid group
KW - model
KW - saturation
KW - stability
KW - theory
KW - ∀∃-formula
KW - for all there exists-formula
UR - http://www.scopus.com/inward/record.url?scp=85047136866&partnerID=8YFLogxK
U2 - 10.1007/s10469-018-9476-7
DO - 10.1007/s10469-018-9476-7
M3 - Article
AN - SCOPUS:85047136866
VL - 57
SP - 29
EP - 38
JO - Algebra and Logic
JF - Algebra and Logic
SN - 0002-5232
IS - 1
ER -
ID: 13488294