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A-algebra Structure on Connected Multiplicative Operad

Received: 2 August 2024     Accepted: 9 September 2024     Published: 29 September 2024
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Abstract

This work develops the structure of A-algebras on operad theory and also the preservation of this structure by a morphism of operads well defined. This structure defined here is motivated by the important role that play certain particular properties such as multiplication and connectivity on the operads. Another key ingredient used to develop this work is the brace operations; which, combined with the properties cited above allowed to better frame the study of this structure. Thus, this paper show explicitly the existence of an A-algebra structure on any connected multiplicative operad endowed with its brace operations and that this structure is minimal if the operad is only multiplicative. Furthermore, the paper also shows the existence of an operads morphism from an unital associative operad, Ass to any connected multiplicative operad 𝒪 preserving the structure of A-algebras existing on these two operads. And when the operad 𝒪 is just multiplicative then there is rather a morphism of operads from the associative operad, Asto 𝒪 preserving this time the minimal A-algebras structure existing on these operads.

Published in Pure and Applied Mathematics Journal (Volume 13, Issue 5)
DOI 10.11648/j.pamj.20241305.12
Page(s) 72-78
Creative Commons

This is an Open Access article, distributed under the terms of the Creative Commons Attribution 4.0 International License (http://creativecommons.org/licenses/by/4.0/), which permits unrestricted use, distribution and reproduction in any medium or format, provided the original work is properly cited.

Copyright

Copyright © The Author(s), 2024. Published by Science Publishing Group

Keywords

A-algebra Structure, Minimal A-algebra Structure, Connected Multiplicative Operad, Brace Operations

References
[1] A. Prouté Algèbres différentielles fortement homotopiquement associatives, Thèse d’Etat, Universit? Paris VII, 1984.
[2] B. Fresse, Homotopy of Operads & GROTHENDIECK- TEICHMÜLLER Groups, vol 19, A. M. S, Book in preparation, (December 2012).
[3] Batkam Mbatchou V. JackyIII, Calvin Tcheka, Simplicial Structure on Connected Multiplicative Operads (Arxiv).
[4] E. Getzler, J. D. S. Jones, A∞-algebras and the cyclic bar complex, Illinois J. Math. 34 (1990), 256-283.
[5] E. Skoldberg, (Co)homology of monomial algebras, Ph. D. Thesis, Stockholm University, 1997
[6] F. R. Cohen, The homology of Cn+1-spaces, n 0, Springer Lect. Notes in Math. 533 (1976), 207-351.
[7] J. D. Stasheff, Homotopy associativity of H-spaces, I., II, Trans. Amer. Math. Soc. 108 (1963), 275-312.
[8] J. D. Stashef, Differential graded Lie algebras, Quasi- Hopf algebras, and higher homotopy algebras, Quantum Groups, Proc. workshops, Euler Int. Math. Inst., Leningrad 1990, Lecture Notes in Mathematics 1510, Springer 1992, 120-137.
[9] J. F. Adams, Infinite loop spaces, Ann. of Math. Stud., Vol. 90, Princeton Univ. Press, Princeton, N. J., 1978.
[10] J. P. May, The geometry of iterated loop spaces, Springer Lecture Notes in Math. 271, 1972.
[11] J. L. Loday and B. Valette, Algebraic Operads, Version 0.999, Book, (18 January 2012).
[12] J. M. Boardman, R. Vogt, Homotopy invariant algebraic structures on topological spaces, Springer Lect. Notes in Math. 347, 1973.
[13] L. Johansson, L. Lambe, Transferring Algebra Structures Up to Homology Equivalence, Preprint, 1996, to appear in Math. Scand.
[14] J. McCleary (Ed.), Higher homotopy structures in topology and mathematical physics, Contemp. Math., 227, Amer. Math. Soc., Providence, RI, 1999.
[15] M. Lazard, Lois de groupes et analyseurs, Ann. Sci. Ec. Norm. Sup. Paris 62 ( 1955), 299-400.
[16] M. Livernet and F. Patras, Lie theory for Hopf operads, journal of Algebra, (2008), 319, 4899-4920.
[17] V. A. Smirnov, Homology of fiber spaces (Russian), Uspekhi Mat. Nauk 35 (1980), 227-230. Translated in Russ. Math. Surveys 35 (1980), 294-298.
[18] V. K. A. M. Gugenheim, L. A. Lambe, J. D. Stasheff, Perturbation theory in differential homological algebra II, Illinois J. Math. 35 (1991), 357-373.
[19] S. A. Merkulov, Strong homotopy algebras of a Kähler manifold, available at
[20] S. Maclane, Categories for the working mathematician, Springer Graduate Text in Maths 5, 1971.
[21] S. Ovsienko, On derived categories of representations categories, in: XVIII Allunion algebraic conference, Proceedings, Part II, Kishinev, (1985), 71.
[22] S. Eilenberg and S. Mac Lane, On the Groups H(π,n), Annals of Mathematics, Second Series, Vol. 58, No. 1 (Jul., 1953), pp. 55-106
[23] T. V. Kadeishvili, On the theory of homology of fiber spaces (Russian), Uspekhi Mat. Nauk 35 (1980), 183- 188. Translated in Russ. Math. Surv. 35 (1980), 231-238.
[24] T. V. Kadeishvili, Thealgebraicstructureinthehomology of an A(∞)-algebra (Russian), Soobshch. Akad. Nauk Gruzin. SSR 108 (1982), 249-252.
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  • APA Style

    III, B. M. V. J., Tcheka, C. (2024). A∞-algebra Structure on Connected Multiplicative Operad. Pure and Applied Mathematics Journal, 13(5), 72-78. https://doi.org/10.11648/j.pamj.20241305.12

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    ACS Style

    III, B. M. V. J.; Tcheka, C. A∞-algebra Structure on Connected Multiplicative Operad. Pure Appl. Math. J. 2024, 13(5), 72-78. doi: 10.11648/j.pamj.20241305.12

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    AMA Style

    III BMVJ, Tcheka C. A∞-algebra Structure on Connected Multiplicative Operad. Pure Appl Math J. 2024;13(5):72-78. doi: 10.11648/j.pamj.20241305.12

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  • @article{10.11648/j.pamj.20241305.12,
      author = {Batkam Mbatchou Vane Jacky III and Calvin Tcheka},
      title = {A∞-algebra Structure on Connected Multiplicative Operad},
      journal = {Pure and Applied Mathematics Journal},
      volume = {13},
      number = {5},
      pages = {72-78},
      doi = {10.11648/j.pamj.20241305.12},
      url = {https://doi.org/10.11648/j.pamj.20241305.12},
      eprint = {https://article.sciencepublishinggroup.com/pdf/10.11648.j.pamj.20241305.12},
      abstract = {This work develops the structure of A∞-algebras on operad theory and also the preservation of this structure by a morphism of operads well defined. This structure defined here is motivated by the important role that play certain particular properties such as multiplication and connectivity on the operads. Another key ingredient used to develop this work is the brace operations; which, combined with the properties cited above allowed to better frame the study of this structure. Thus, this paper show explicitly the existence of an A∞-algebra structure on any connected multiplicative operad endowed with its brace operations and that this structure is minimal if the operad is only multiplicative. Furthermore, the paper also shows the existence of an operads morphism from an unital associative operad, Ass to any connected multiplicative operad 𝒪 preserving the structure of A∞-algebras existing on these two operads. And when the operad 𝒪 is just multiplicative then there is rather a morphism of operads from the associative operad, Asto 𝒪 preserving this time the minimal A∞-algebras structure existing on these operads.},
     year = {2024}
    }
    

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    Y1  - 2024/09/29
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    JF  - Pure and Applied Mathematics Journal
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    AB  - This work develops the structure of A∞-algebras on operad theory and also the preservation of this structure by a morphism of operads well defined. This structure defined here is motivated by the important role that play certain particular properties such as multiplication and connectivity on the operads. Another key ingredient used to develop this work is the brace operations; which, combined with the properties cited above allowed to better frame the study of this structure. Thus, this paper show explicitly the existence of an A∞-algebra structure on any connected multiplicative operad endowed with its brace operations and that this structure is minimal if the operad is only multiplicative. Furthermore, the paper also shows the existence of an operads morphism from an unital associative operad, Ass to any connected multiplicative operad 𝒪 preserving the structure of A∞-algebras existing on these two operads. And when the operad 𝒪 is just multiplicative then there is rather a morphism of operads from the associative operad, Asto 𝒪 preserving this time the minimal A∞-algebras structure existing on these operads.
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