Geodesic
Algèbre, Géométrie et Topologie
Infinite symmetric products of rational algebras and spaces
Hu, Jiahao1 ; Milivojević, Aleksandar2
1 Stony Brook University, Department of Mathematics, 100 Nicolls Road, 11794 Stony Brook, USA
2 Max Planck Institute for Mathematics, Vivatsgasse 7, 53111 Bonn, Germany
Comptes Rendus. Mathématique, Tome 360 (2022) no. G3, pp. 275-284.

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We show that the infinite symmetric product of a connected graded-commutative algebra over is naturally isomorphic to the free graded-commutative algebra on the positive degree subspace of the original algebra. In particular, the infinite symmetric product of a connected commutative (in the usual sense) graded algebra over is a polynomial algebra. Applied to topology, we obtain a quick proof of the Dold–Thom theorem in rational homotopy theory for connected spaces of finite type. We also show that finite symmetric products of certain simple free graded-commutative algebras are free; this allows us to determine minimal Sullivan models for finite symmetric products of complex projective spaces.

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DOI : 10.5802/crmath.298
Classification : 13A02, 16E45, 55P62
Mots-clés : Symmetric products, Dold–Thom theorem

Hu, Jiahao 1 ; Milivojević, Aleksandar 2

1 Stony Brook University, Department of Mathematics, 100 Nicolls Road, 11794 Stony Brook, USA
2 Max Planck Institute for Mathematics, Vivatsgasse 7, 53111 Bonn, Germany
Licence : CC-BY 4.0
Droits d'auteur : Les auteurs conservent leurs droits 
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Hu, Jiahao; Milivojević, Aleksandar. Infinite symmetric products of rational algebras and spaces. Comptes Rendus. Mathématique, Tome 360 (2022) no. G3, pp. 275-284. doi : 10.5802/crmath.298. https://geodesic-test.mathdoc.fr/articles/10.5802/crmath.298/

[1] Bousfield, A. K.; Gugenheim, V. K. On PL De Rham theory and rational homotopy type, Memoirs of the American Mathematical Society, 179, American Mathematical Society, 1976 | Zbl

[2] Conca, Aldo; Krattenthaler, Christian; Watanabe, Junzo Regular sequences of symmetric polynomials, Rend. Semin. Mat. Univ. Padova, Volume 121 (2009), pp. 179-199 | mathdoc-id | MR | DOI | Zbl

[3] Dalbec, John Multisymmetric functions, Beitr. Algebra Geom., Volume 40 (1999) no. 1, pp. 27-51 | Zbl | MR

[4] Dold, Albrecht; Thom, René Quasifaserungen und unendliche symmetrische Produkte, Ann. Math., Volume 67 (1958), pp. 239-281 | Zbl | MR | DOI

[5] Félix, Yves; Tanré, Daniel Rational homotopy of symmetric products and spaces of finite subsets, Homotopy theory of function spaces and related topics (Contemporary Mathematics), Volume 519, American Mathematical Society, 2010, pp. 77-92 | Zbl | MR | DOI

[6] Hess, Kathryn Rational homotopy theory: a brief introduction, Interactions between homotopy theory and algebra. Summer school, University of Chicago, IL, USA, July 26–August 6 (Contemporary Mathematics), Volume 436, American Mathematical Society, 2007, pp. 175-202 | Zbl | MR | DOI

[7] Hirschhorn, Philip S. Notes on homotopy colimits and homotopy limits (2014) (http://www-math.mit.edu/~psh/notes/hocolim.pdf)

[8] Macdonald, Ian G. The Poincaré polynomial of a symmetric product, Proc. Camb. Philos. Soc., Volume 58 (1962), pp. 563-568 | Zbl | DOI

[9] Macdonald, Ian G. Symmetric functions and Hall polynomials, Oxford Mathematical Monographs, Oxford University Press, 1979

[10] Scheerer, Hans; Stelzer, Manfred Fibrewise infinite symmetric products and M-category, Bull. Korean Math. Soc., Volume 36 (1999) no. 4, pp. 671-682 | Zbl | MR

[11] Sullivan, Dennis Infinitesimal computations in topology, Publ. Math., Inst. Hautes Étud. Sci., Volume 47 (1977) no. 1, pp. 269-331 | Zbl | mathdoc-id | DOI

[12] Vaccarino, Francesco The ring of multisymmetric functions, Ann. Inst. Fourier, Volume 55 (2005) no. 3, pp. 717-731 | mathdoc-id | MR | DOI | Zbl

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