Weighted estimates for commutators of anisotropic Calderon-Zygmund operators

Let T be an anisotropic Calderon-Zygmund operator and b is an element of Lip(alpha,w)(R-n,A) with 0 < alpha <1 and Lip(alpha,w)(R-n,A) being an anisotropic weighted Lipschitz space. The goal of the paper is to give five boundedness theorems of the commutator [b,T]. Precisely, [b,T] is bounded from L-w(q)(R-n) to Lw(1-qr)(qr)(R-n), where w is an element of A(qr)(A), 1/qr=1/q - alpha/n, 1<q < n/alpha and 1 < r Pampus minor(Actinopterygii: Perciformes: Stromateidae) from the coastal waters of Wenzhou, China