Weak amenability of triangular Banach algebras

Forrest, B.; Marcoux, L.

doi:10.1090/S0002-9947-01-02957-9

Weak amenability of triangular Banach algebras
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by B. E. Forrest and L. W. Marcoux PDF

Trans. Amer. Math. Soc. 354 (2002), 1435-1452 Request permission

Abstract:

Let $\mathcal {A}$ and $\mathcal {B}$ be unital Banach algebras, and let $\mathcal {M}$ be a Banach $\mathcal {A},\mathcal {B}$-module. Then $\mathcal {T} = \begin {bmatrix}\mathcal {A} & \mathcal {M}\\ 0 & \mathcal {B} \end {bmatrix}$ becomes a triangular Banach algebra when equipped with the Banach space norm $\left \Vert \begin {bmatrix} a & m\\ 0 & b \end {bmatrix} \right \Vert = \Vert a \Vert _{\mathcal {A}} + \Vert m \Vert _{\mathcal {M}} + \Vert b \Vert _{\mathcal {B}}$. A Banach algebra $\mathcal {T}$ is said to be $n$-weakly amenable if all derivations from $\mathcal {T}$ into its $n^{\mathrm {th}}$ dual space $\mathcal {T}^{(n)}$ are inner. In this paper we investigate Arens regularity and $n$-weak amenability of a triangular Banach algebra $\mathcal {T}$ in relation to that of the algebras $\mathcal {A}$, $\mathcal {B}$ and their action on the module $\mathcal {M}$.

References

W. G. Bade, P. C. Curtis Jr., and H. G. Dales, Amenability and weak amenability for Beurling and Lipschitz algebras, Proc. London Math. Soc. (3) 55 (1987), no. 2, 359–377. MR 896225, DOI 10.1093/plms/s3-55_{2}.359
W. G. Bade, H. G. Dales, and Z. A. Lykova, Algebraic and strong splittings of extensions of Banach algebras, Mem. Amer. Math. Soc. 137 (1999), no. 656, viii+113. MR 1491607, DOI 10.1090/memo/0656
Erik Christensen, Derivations of nest algebras, Math. Ann. 229 (1977), no. 2, 155–161. MR 448110, DOI 10.1007/BF01351601
Paul Civin and Bertram Yood, The second conjugate space of a Banach algebra as an algebra, Pacific J. Math. 11 (1961), 847–870. MR 143056, DOI 10.2140/pjm.1961.11.847
H. G. Dales, F. Ghahramani, and N. Grønbæk, Derivations into iterated duals of Banach algebras, Studia Math. 128 (1998), no. 1, 19–54. MR 1489459
Kenneth R. Davidson, Nest algebras, Pitman Research Notes in Mathematics Series, vol. 191, Longman Scientific & Technical, Harlow; copublished in the United States with John Wiley & Sons, Inc., New York, 1988. Triangular forms for operator algebras on Hilbert space. MR 972978
B. E. Forrest and L. W. Marcoux, Derivations of triangular Banach algebras, Indiana Univ. Math. J. 45 (1996), no. 2, 441–462. MR 1414337, DOI 10.1512/iumj.1996.45.1147
F. L. Gilfeather and R. R. Smith, Cohomology for operator algebras: joins, Amer. J. Math. 116 (1994), no. 3, 541–561. MR 1277445, DOI 10.2307/2374990
U. Haagerup, All nuclear $C^{\ast }$-algebras are amenable, Invent. Math. 74 (1983), no. 2, 305–319. MR 723220, DOI 10.1007/BF01394319
Barry Edward Johnson, Cohomology in Banach algebras, Memoirs of the American Mathematical Society, No. 127, American Mathematical Society, Providence, R.I., 1972. MR 0374934
Richard V. Kadison, Derivations of operator algebras, Ann. of Math. (2) 83 (1966), 280–293. MR 193527, DOI 10.2307/1970433
Gerard J. Murphy, $C^*$-algebras and operator theory, Academic Press, Inc., Boston, MA, 1990. MR 1074574
Theodore W. Palmer, Banach algebras and the general theory of $^*$-algebras. Vol. I, Encyclopedia of Mathematics and its Applications, vol. 49, Cambridge University Press, Cambridge, 1994. Algebras and Banach algebras. MR 1270014, DOI 10.1017/CBO9781107325777
Shôichirô Sakai, Derivations of $W^{\ast }$-algebras, Ann. of Math. (2) 83 (1966), 273–279. MR 193528, DOI 10.2307/1970432