English

Completely bounded bimodule maps and spectral synthesis

Functional Analysis 2017-01-03 v1 Operator Algebras

Abstract

We initiate the study of the completely bounded multipliers of the Haagerup tensor product A(G)hA(G)A(G)\otimes_{\rm h} A(G) of two copies of the Fourier algebra A(G)A(G) of a locally compact group GG. If EE is a closed subset of GG we let E={(s,t):stE}E^{\sharp} = \{(s,t) : st\in E\} and show that if EE^{\sharp} is a set of spectral synthesis for A(G)hA(G)A(G)\otimes_{\rm h} A(G) then EE is a set of local spectral synthesis for A(G)A(G). Conversely, we prove that if EE is a set of spectral synthesis for A(G)A(G) and GG is a Moore group then EE^{\sharp} is a set of spectral synthesis for A(G)hA(G)A(G)\otimes_{\rm h} A(G). Using the natural identification of the space of all completely bounded weak* continuous VN(G)VN(G)'-bimodule maps with the dual of A(G)hA(G)A(G)\otimes_{\rm h} A(G), we show that, in the case GG is weakly amenable, such a map leaves the multiplication algebra of L(G)L^{\infty}(G) invariant if and only if its support is contained in the antidiagonal of GG.

Cite

@article{arxiv.1701.00258,
  title  = {Completely bounded bimodule maps and spectral synthesis},
  author = {M. Alaghmandan and I. G. Todorov and L. Turowska},
  journal= {arXiv preprint arXiv:1701.00258},
  year   = {2017}
}

Comments

44 pages

R2 v1 2026-06-22T17:38:48.656Z