An investigation of approximately biprojective Banach algebras
Subject Areas : Statistics
1 - Department of Mathematics, Azarbaijan Shahid Madani University, Tabriz 53751- 71379, Iran
Keywords: عملگر قطری, دوگان دوم جبر باناخ, ضرب آرنز, جبر های باناخ ادغامی,
Abstract :
The concept of approximately biprojective Banach algebras has been introduced by Pourmahmood-Aghababa [15], O. Ya. Aristov [2] and Y. Zhang [19] in different aspects of approximation. Here we follow the definition provided by Pourmahmood-Aghababa that is more general with an abundant amount of various interesting examples, and less restrictive conditions. In this paper, some hereditary properties of this notion are investigated. Indeed, we show that approximate biprojectivity of the second dual of a Banach algebra A (equipped with Arens product) implies approximate biprojectivity of A. This concept is also investigated on amalgamated Banach algebras that are genuine generalization of the direct sum of Banach algebras and includes the unitization, the Lau product, the semidirect product, and the module extension Banach algebras. We prove that the first summand in an approximately biprojective amalgamated Banach algebra is approximately biprojective, while for approximate biprojectivity of the second summand some additional hypothesis are necessary.
[1] R. Arens, The adjoint of a bilinear operation, Proc. American Math. Soc. 2 (1951), 839-848.
[2] O. Yu. Aristov, On approximation of flat Banach modules by free modules, Sbornik. Math. 196(11) (2005), 1553-1583.
[3] G. Dales, Banach Algebra and Automatic Continuity, Oxford University Press. (2001).
[4] H. G. Dales, R. J. Loy and Y. Zhang, Approximate amenability for Banach sequence algebras, Studia Math. 177 (2006), 81–96.
[5] M. D’Anna and M. Fontana, An amalgamated duplication of a ring along an ideal: the basic properties, J. Algebra Appl. 6(3) (2007), 443-459.
[6] T. Duncan and S. A. R. Hosseiniun, The second dual of a Banach algebra, Proc. Royal Soc. Edinburgh, Sect. A, 84 (1979), 309-325.
[7] F. Ghahramani, R. Loy, Generalized notions of amenability, J. Funct. Anal. 208 (2004) 229–260.
[8] F. Ghahramani, R. Loy and G. Willis, Amenability and weak amenability of second conjugate Banach algebras, Proc. Amer. Math. Soc. 124 (5), 1489-1497.
[9] F. Ghahramani and Y. Zhang, Pseudo-amenable and pseudo-contractible banach algebras, Math Proc Cambridge Philos 142 (2007), 111-123.
[10] F. Gourdeau, Amenability of Banach algebras, Ph.D. thesis, University of Cambridge, 1989.
[11] R. J. Loy and G. A. Willis, The approximation property and nilpotent ideals in amenable Banach algebras, Bull. Austral. Math. Soc. 49 (1994), 341-346.
[12] M. S. Moslehian and A. Niknam, Biflatness and biprojectivity of second dual of Banach algebras, Southeast Asian Bull. Math. 27(1) (2003), 129-133.
[13] N. Ozawa, A note on non-amenability of for , Internat. J. Math. 15 (2004), 557–565.
[14] T. W. Palmer, Banach Algebras and the General Theory of *-Algebras, I. Cambridge University Press, 1994.
[15] H. Pourmahmood-Aghababa, Approxi-mately biprojective Banach algebras and nilpotent ideals, Bull. Aust. Math. Soc. 87 (2013), 158-173.
[16] H. Pourmahmood-Aghababa and M. H. Sattari, Approximate biprojectivity and biflatness of some algebras over certain semigroups, J. Iran. Math. Soc.1(2) (2020), 145-155.
[17] H. Pourmahmood-Aghababa, and N. Shirmohammadi, On amalgamated Banach algebras, Period. Math. Hung. 75(1) (2017), 1-13.
[18] V. Runde, Lectures on Amenability, in: Lect. Notes in Mathematics, Springer Verlag, Berlin, Heidelberg, 2002.
[19] Y. Zhang, Nilpotent ideals in a class of Banach algebras, Proc. Amer. Math. Soc. 127(11) (1999), 3237-3242.