On Arf-invariants in the codimension $1$ in a Wall group of the dihedral group

Petr Mikhailovich Akhmet'ev; Ахметьев Петр Михайлович; Yury Vladimirovich Muranov; Муранов Юрий Владимирович

doi:10.4213/sm9716

On Arf-invariants in the codimension $1$ in a Wall group of the dihedral group

Authors: Akhmet'ev P.M.¹^,2, Muranov Y.V.³
Affiliations:
1. Moscow Institute of Electronics and Mathematics — Higher School of Economics
2. Pushkov Institute of Terrestrial Magnetism, Ionosphere, and Radio Wave Propagation, Russian Academy of Sciences
3. University of Warmia and Mazury in Olsztyn
Issue: Vol 214, No 5 (2023)
Pages: 3-17
Section: Articles
URL: https://bakhtiniada.ru/0368-8666/article/view/133515
DOI: https://doi.org/10.4213/sm9716
ID: 133515

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Abstract
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Abstract

An element $x$ is specified in the Wall group $L_{3} (D_{3})$ of the dihedral group of order $8$ with trivial orientation character, such that $x$ is an element of the third type in the sense of Kharshiladze with respect to any system of one-sided submanifolds of codimension $1$ for which the splitting obstruction group along the first submanifold is isomorphic to $L N_{1} (Z / 2 \oplus Z / 2 \to D_{3})$ . The element $x$ is not realisable as an obstruction to surgery on a closed $P L$ -manifold. It is also proved that the unique nontrivial element of the group $L N_{3} (Z / 2 \oplus Z / 2 \to D_{3}^{-})$ can be detected using the Hasse-Witt $W h_{2}$ -torsion.

Keywords

Browder-Livesay groups, Wall groups, one-sided submanifolds, codimension-one Arf invariant, splitting obstructions, Hasse-Witt torsion

About the authors

Petr Mikhailovich Akhmet'ev

Moscow Institute of Electronics and Mathematics — Higher School of Economics; Pushkov Institute of Terrestrial Magnetism, Ionosphere, and Radio Wave Propagation, Russian Academy of Sciences

Author for correspondence.
Email: pmakhmet@mi-ras.ru
Doctor of physico-mathematical sciences, no status

Yury Vladimirovich Muranov

University of Warmia and Mazury in Olsztyn

Email: ymuranov@mail.ru
Doctor of physico-mathematical sciences, Professor

References

W. Browder, “The Kervaire invariant of framed manifolds and its generalization”, Ann. of Math. (2), 90 (1969), 157–186
V. P. Snaith, Stable homotopy around the Arf–Kervaire invariant, Progr. Math., 273, Birkhäuser Verlag, Basel, 2009, xiv+239 pp.
C. T. C. Wall, Surgery on compact manifolds, Math. Surveys Monogr., 69, 2nd ed., Amer. Math. Soc., Providence, RI, 1999, xvi+302 pp.
A. Ranicki, Exact sequences in the algebraic theory of surgery, Math. Notes, 26, Princeton Univ. Press, Princeton, NJ; Univ. of Tokyo Press, Tokyo, 1981, xvii+864 pp.
А. Ф. Харшиладзе, “Перестройка многообразий с конечными фундаментальными группами”, УМН, 42:4(256) (1987), 55–85
Ю. В. Муранов, “Задача расщепления”, Отображения и размерность, Сборник статей. К 100-летию со дня рождения академика Павла Сергеевича Александрова, Труды МИАН, 212, Наука, М., 1996, 123–146
C. T. C. Wall, “Formulae for surgery obstructions”, Topology, 15:3 (1976), 189–210
W. Browder, G. R. Livesay, “Fixed point free involutions on homotopy spheres”, Bull. Amer. Math. Soc., 73:2 (1967), 242–245
S. Lopez de Medrano, Involutions on manifolds, Ergeb. Math. Grenzgeb., 59, Springer-Verlag, New York–Heidelberg, 1971, ix+103 pp.
S. E. Cappell, J. L. Shaneson, “Pseudo-free actions. I”, Algebraic topology, Aarhus 1978 (Univ. Aarhus, Aarhus, 1978), Lecture Notes in Math., 763, Springer, Berlin, 1979, 395–447
I. Hambleton, “Projective surgery obstructions on closed manifolds”, Algebraic K-theory, Part II (Oberwolfach, 1980), Lecture Notes in Math., 967, Springer, Berlin–New York, 1982, 101–131
А. Ф. Харшиладзе, “Итерированные инварианты Браудера–Ливси и узинг-проблема”, Матем. заметки, 41:4 (1987), 557–563
А. Ф. Харшиладзе, “Эрмитова $K$-теория и квадратичные расширения колец”, Тр. ММО, 41, Изд-во Моск. ун-та, М., 1980, 3–36
Ю. В. Муранов, А. Ф. Харшиладзе, “Группы Браудера–Ливси абелевых 2-групп”, Матем. сб., 181:8 (1990), 1061–1098
C. T. C. Wall, “Foundations of algebraic L-theory”, Algebraic K-theory. III. Hermitian K-theory and geometric applications (Battelle Memorial Inst., Seattle, WA, 1972), Lecture Notes in Math., 343, Springer, Berlin, 1973, 266–300
C. T. C. Wall, “On the axiomatic foundations of the theory of Hermitian forms”, Proc. Cambridge Philos. Soc., 67:2 (1970), 243–250
C. T. C. Wall, “Classification of Hermitian Forms. VI. Group rings”, Ann. of Math. (2), 103:1 (1976), 1–80
A. Ranicki, “The $L$-theory of twisted quadratic extensions”, Canad. J. Math., 39:2 (1987), 345–364
А. Ф. Харшиладзе, “Препятствия к перестройкам для группы $(pitimes Z_2)$”, Матем. заметки, 16:5 (1974), 823–832
Ю. В. Муранов, Д. Реповш, “Перестройки замкнутых многообразий с диэдральной фундаментальной группой”, Матем. заметки, 64:2 (1998), 238–250
C. T. C. Wall, “Some $L$ groups of finite groups”, Bull. Amer. Math. Soc., 79:3 (1973), 526–529
Ю. В. Муранов, “Группы Браудера–Ливси диэдральной группы”, УМН, 47:2(284) (1992), 203–204
П. М. Ахметьев, “$K_2$ для простейших целочисленных групповых колец и топологические приложения”, Матем. сб., 194:1 (2003), 23–30
Zhengguo Yang, Guoping Tang, Hang Liu, “On the structure of $K_2(mathbb Z[C_2 times C_2])$”, J. Pure Appl. Algebra, 221:4 (2017), 773–779
Wu-Chung Hsiang, R, W. Sharpe, “Parametrized surgery and isotopy”, Pacific J. Math., 67:2 (1976), 401–459

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