Abstract
A subgroup H of the circle group \(\mathbb T\) is said to be characterized by a sequence \(\mathbf {u}= (u_n)_{n\in \mathbb N}\) of integers if \(H=\{x\in \mathbb T: u_nx\rightarrow 0\}\). The characterized subgroups of \(\mathbb T\) are known also under the name topologically \(\mathbf {u}\)-torsion subgroups. This survey paper is dedicated to the characterized subgroups of \(\mathbb T\): we recall their main properties and collect most of the basic results from the wide bibliography, following, when possible, the historical line, and trying to show the deep roots of this topic in several areas of Mathematics. Due to this universality of the topic, many notions and results were found independently by various authors working unaware of each other, so our effort is also directed towards giving credit to all of them to the best of our knowledge. We provide also some background on the notions of characterized subgroup and topologically \(\mathbf {u}\)-torsion subgroup in the general case of topological abelian groups, where they differ very substantially.
This is a preview of subscription content, log in via an institution to check access.
Similar content being viewed by others
Notes
Here \(X \subset ^* Y\) for subsets of \(\mathbb N\) means, as usual, that \(X \setminus Y\) is finite.
References
Aaronson, J., Nadkarni, M.: \(L_\infty \) eigenvalues and \(L_2\) spectra of no-singular transformations. Proc. Lond. Math. Soc. 55(3), 538–570 (1987)
Arbault, J.: Sur l’ensemble de convergence absolue d’une série trigonométrique. Bull. Soc. Math. Fr. 80, 253–317 (1952)
Armacost, D.: The Structure of Locally Compact Abelian Groups. Monographs and Textbooks in Pure and Applied Mathematics, vol. 68. Marcel Dekker Inc., New York (1981)
Barbieri, G., Dikranjan, D., Giordano Bruno, A., Weber, H.: Dirichlet sets vs characterized subgroups. Topol. Appl. 231, 50–76 (2017)
Barbieri, G., Giordano Bruno, A., Weber, H.: Inclusions of characterized subgroups of \({\mathbb{R}}\). Topol. Appl. 221, 534–555 (2017)
Barbieri, G., Dikranjan, D., Milan, C., Weber, H.: Answer to Raczkowski’s quests on converging sequences of integers. Topol. Appl. 132(1), 89–101 (2003)
Barbieri, G., Dikranjan, D., Milan, C., Weber, H.: Convergent sequences in precompact group topologies. Appl. Gen. Topol. 6(2), 149–169 (2005)
Barbieri, G., Dikranjan, D., Milan, C., Weber, H.: \(t\)-dense subgroups of topological abelian groups. Quest. Answ. Gen. Topol. 24(2), 99–118 (2006)
Barbieri, G., Dikranjan, D., Milan, C., Weber, H.: Topological torsion related to some recursive sequences of integers. Math. Nachr. 281(7), 930–950 (2008)
Beiglböck, M.: Strong characterizing sequences of countable subgroups. J. Number Theory 127(2), 145–152 (2007)
Beiglböck, M., Steineder, C., Winkler, R.: Sequences and filters of characters characterizing subgroups of compact abelian groups. Topol. Appl. 153(11), 1682–1695 (2006)
Biró, A.: Characterizations of groups generated by Kronecker sets. Journal de théorie des nombres de Bordeaux 19(3), 567–582 (2007)
Biró, A.: Strong characterizing sequences for subgroups of compact groups. J. Number Theory 121(2), 324–354 (2006)
Bíró, A., Deshouillers, J.-M., Sós, V.T.: Good approximation and characterization of subgroups of \({\mathbb{R}}/{\mathbb{Z}}\). Studia Sci. Math. Hungar. 38, 97–113 (2001)
Biró, A., Sós, V.T.: Strong characterizing sequences in simultaneous Diophantine approximation. J. Number Theory 99, 405–414 (2003)
Borel, J.-P.: Sous-groupes de \({\mathbb{R}}\) liés à la répartition modulo \(1\) de suites. Ann. Fac. Sci. Toulouse Math. 5(3–4), 217–235 (1983)
Borel, J.-P.: Sur certains sous-groupes de \({\mathbb{R}}\) liés á la suite des factorielles. Colloq. Math. 62(1), 21–30 (1991)
Braconnier, J.: Sur les groupes topologiques localement compacts. J. Math. Pures Appl (9) 27, 1–85 (1948)
Bukovský, L.: The Structure of the Real Line. Birkhäuser, Basel (2011)
Bukovský, L., Kholshchevnikova, N.N., Repický, M.: Thin sets in harmonic analysis and infinite combinatorics. Real Anal. Exch. 20, 454–509 (1994/1995)
Clark, B., Cates, S.: Algebraic obstructions to sequential converhence in Hausdorff abelian groups. Int. J. Math. Math. Sci. 21(1), 93–96 (1998)
Comfort, W.W., Raczkowski, S.U., Trigos-Arrieta, F.J.: Making group topologies with, and without, convergent sequences. Appl. Gen. Topol. 7, 109–124 (2006)
Comfort, W., Trigos-Arrieta, FJavier, Wu, Ta Sun: The Bohr compactification, modulo a metrizable subgroup. Fund. Math. 143, 119–136 (1993)
Comfort, W., Ross, K.: Topologies induced by groups of characters. Fund. Math. 55, 283–291 (1964)
Di Santo, R.: Connessione di Galois di un gioco topologico, Master Thesis, University of Udine (2001)
Di Santo, R., Dikranjan, D.: Answer to Armacost’s quest on topologically torsion elements of the circle group. Commun. Algebra 32, 133–146 (2004)
Di Santo, R., Dikranjan, D.: A characterization of the circle group via uniqueness of roots. Topol. Appl. 158, 159–166 (2011)
Dikranjan, D.: Recent progress in minimal topological groups. Topol. Appl. 85, 53–91 (1998)
Dikranjan, D.: Topologically torsion elements of topological groups. Topol. Proc. 26, 505–532 (2001–2002)
Dikranjan, D.: Closure operators related to von Neumann’s kernel. Topol. Appl. 153(11), 1930–1955 (2006)
Dikranjan, D.: Separation via sequential limit laws in topological groups, III Japa-México joint meeting in Topology and its Applications, December 2004, Oaxaca (México) (2004)
Dikranjan, D., Gabriyelyan, S.: Characterized subgroup of the compact abelian groups. Topol. Appl. 160, 2427–2442 (2013)
Dikranjan, D., Gabriyelyan, S., Tarieladze, V.: Characterizing sequences for precompact group topologies. J. Math. Anal. Appl. 412(1), 505–519 (2014)
Dikranjan, D., Giordano Bruno, A., Impieri, D.: Characterized subgroups of topological abelian groups. Axioms 4, 459–491 (2015)
Dikranjan, D., Impieri, D.: Topologically torsion elements of the circle group. Commun. Algebra 42, 600–614 (2014)
Dikranjan, D., Impieri, D.: Question on the Borel complexity of characterized subgroup of the compact abelian groups. Quest. Answ. Gen. Topol. 32, 127–144 (2014)
Dikranjan, D., Impieri, D.: On the Borel complexity of characterized subgroup of the compact abelian groups. Topol. Appl. 201, 372–387 (2016)
Dikranjan, D., Impieri, D.: On Hewitt groups and finer locally compact group topologies. Topol. Appl. 192, 84–97 (2015)
Dikranjan, D., Kunen, K.: Characterizing countable subgroups of compact abelian groups. J. Pure Appl. Algebra 208, 285–291 (2007)
Dikranjan, D., Megrelishvili, M.: Minimality conditions in topological groups. In: Hart, K.P., van Mill, Jan, Simon, P. (eds.) Recent Progress in General Topology III, pp. 229–327. Springer, Berlin (2014)
Dikranjan, D., Milan, C., Tonolo, A.: A characterization of the MAP abelian groups. J. Pure Appl. Algebra 197, 23–41 (2005)
Dikranjan, D., Prodanov, I.: A class of compact abelian groups. Annuaire Univ. Sofia Fac. Math. Méc. 70, 191– 206 (1975/76)
Dikranjan, D., Stoyanov, L.: A-classes of minimal abelian groups. Annuaire Univ. Sofia, Fac. Math. Méc. 71, part II, 53–62 (1976/77)
Dikranjan, D., Prodanov, I., Stoyanov, L.: Topological Groups: Characters, Dualities and Minimal Group Topologies, Pure and Applied Mathematics, vol. 130. Marcel Dekker Inc., New York (1989)
Eliaš, P.: A classification of trigonometrical thin sets and their interrelations. Proc. Am. Math. Soc 125, 1111–1121 (1997)
Eliaš, P.: On inclusions between Arbault sets. Acta Univ. Carol. Math. Phys. 44, 65–72 (2003)
Eliaš, P.: Arbault permitted sets are perfectly meager. Tatra Mt. Math. Publ. 30, 135–148 (2005)
Eliaš, P.: Dirichlet sets, Erdös–Kunen–Mauldin theorem, and analytic subgroups of the reals. Proc. Am. Math. Soc. 139(6), 2093–2104 (2011)
Eggleston, H.G.: Sets of fractional dimensions which occur in some problems of number theory. Proc. Lond. Math. Soc. 54(2), 42–93 (1952)
Erdös, P., Kunen, K., Mauldin, R.D.: Some additive properties of sets of real numbers. Fund. Math. 113, 187–199 (1981)
Fatou, P.: Séries trigonométriques et séries de Taylor. Acta Math. 30, 335–400 (1906)
Gabriyelyan, S.S.: Group of quasi-invariance and the Pontryagin duality. Topol. Appl. 157, 2786–2802 (2010)
Gabriyelyan, S.S.: On \(T\)-sequence and characterized subgroups. Topol. Appl. 157, 2834–2843 (2010)
Gabriyelyan, S.S.: Characterizable groups: some results and open questions. Topol. Appl. 159, 2378–2391 (2012)
Gabriyelyan, S.S.: On \(T\)-characterized subgroups of compact Abelian groups. Axioms 4, 194–212 (2015)
Hart, J.E., Kunen, K.: Limits in function spaces and compact groups. Topol. Appl. 151(1–3), 157–168 (2005)
Hart, J.E., Kunen, K.: Limits in compact abelian groups. Topol. Appl. 153(7), 991–1002 (2006)
Impieri, D.: Charachterized subgroups. Ph.D. Thesis, University of Udine (2015)
Kahane, J.-P.: A metric condition for a closed circular set to be a set of uniqueness. J. Approx. Theory 2(3), 233–236 (1969)
Kahane, J.-P.: Séries de Fourier absolument convergentes, Ergebnisse der Mathematik und ihrer Grenzgebiete, vol. 50. Springer, New York (1970)
Kholshchevnikova, N.N.: On the properties of thin sets for trigonometric series and certain other series. Russ. Acad. Sci. Dokl. Math. 46, 476–479 (1993)
Kopperman, R.D., Mislove, M.W., Morris, S.A., Nickolas, P., Pestov, V., Svetlichny, S.: Limit laws for wide varieties of topological groups. Houst. J. Math. 22, 307–328 (1996)
Kraaikamp, C., Liardet, P.: Good approximations and continued fractions. Proc. Am. Math. Soc. 112, 303–309 (1991)
Kuipers, L., Niederreiter, H.: Uniform Distribution of Sequences. Pure and Applied Mathematics. Wiley-Interscience, New York (1974)
Larcher, G.: A convergence problem connected with continued fractions. Proc. Am. Math. Soc 103(3), 718–722 (1988)
Lukács, G.: Precompact abelian groups and topological annihilators. J. Pure Appl. Algebra 208(3), 1159–1168 (2007)
Marcinkiewicz, J.: Quelques théorèmes sur les séries et les fonctions. Bull. Sém. Math. Univ. Wil. 1, 19–24 (1938)
Marconato, L.: Frazioni continue e caratterizzazione dei sottogruppi ciclici del cerchio unitario, Graduation Thesis, University of Udine (2016)
Morris, S.A., Nickolas, P., Pestov, V.: Limit laws for wide varieties of topological groups II. Houst., J. Math. 26(1), 17–27 (2000)
Negro, G.: Polish LCA groups are strongly characterizable. Topol. Appl. 162, 66–75 (2014)
Perron, O.: Irrationalzahlen. Chelsea, New York (1960)
Protasov, I.V., Zelenyuk, E.G.: Topologies on abelian groups. Math. USSR-Izv 37, 445–460 (1991). (Russian original: Izv. Akad. Nauk SSSR Ser. Mat. 54, 1090–1107 (1990).)
Raczkowski, S.: Totally bounded topological group topologies. PhD Thesis, Wesleyan (1999)
Raczkowski, S.: Totally bounded topological group topologies on the integers. Topol. Appl. 121(1–2), 63–74 (2002)
Robertson, L.: Connectivity, divisibility, and torsion. Trans. Am. Math. Soc. 128, 482–505 (1967)
Solecki, S.: Polish group topologies. In: Sets and Proofs, London Mathematical Society Lecture Notes Series, vol. 258, pp. 339–364. Cambridge University Press, Cambridge (1999)
Schoenberg, I., Suvorov, F.: Asymptotic distribution of sequences. Advanced problems and solutions: solutions: 5090. Am. Math. Mon. 71(3), 332–334 (1964)
Stoyanov, L.: A property of precompact minimal abelian group. Annuaire Univ. Sofia Fac. Math. Méc. 70, 253–260 (1975/76)
Stoyanov, L.: Weak periodicity and minimality of topological groups. Annuaire Univ. Sofia Fac. Math. Méc. 73, 155–167 (1978/79)
Taylor, W.: Varieties of topological algebras. J. Aust. Math. Soc. (Series A) 23, 207–241 (1977)
Vilenkin, N.: A contribution to the theory of direct decompositions of topological groups. C. R. Acad. Sci. URSS 47, 611–613 (1945)
Weber, H., Zoli, E.: Hausdorff measures of subgroups of \({\mathbb{R}}/{\mathbb{Z}}\) and \({\mathbb{R}}\). Ric. Mat. 62(2), 209–228 (2013)
Weyl, H.: Über die Gleichverteilung von Zahlen mod. Eins. Math. Ann. 77(3), 313–352 (1916)
Author information
Authors and Affiliations
Corresponding author
Additional information
Communicated by P. De Lucia.
Dedicated to the 70th birthday of Hans Weber.
Anna Giordano Bruno is supported by Programma SIR 2014 by MIUR (Project GADYGR, Number RBSI14V2LI, cup G22I15000160008) and for this work was partially supported by the “National Group for Algebraic and Geometric Structures, and Their Applications” (GNSAGA - INdAM).
Rights and permissions
About this article
Cite this article
Di Santo, R., Dikranjan, D. & Giordano Bruno, A. Characterized subgroups of the circle group. Ricerche mat 67, 625–655 (2018). https://doi.org/10.1007/s11587-018-0393-9
Received:
Revised:
Published:
Issue Date:
DOI: https://doi.org/10.1007/s11587-018-0393-9
Keywords
- Characterized subgroup
- Topologically \(\mathbf {u}\)-torsion
- Abelian group
- Arithmetic sequence
- Circle group
- Dirichlet set
- Arbault set
- Factorizable subgroup
- Precompact group topology
- T-sequence
- \(\textit{TB}\)-sequence