Adjoints of slant Toeplitz operators II

For an integer k ≥ 2, k th -order slant Toeplitz operator Uϕ [1] with symbol ϕ in L ∞ (T), where T is the unit circle in the complex plane, is an operator whose representing matrix M = (αij ) is given by αij = ϕ, z ki-j , where . , . is the usual inner product in L 2 (T). The operator Vϕ denotes the

In this paper, commutativity of k th -order slant Toeplitz operators are discussed. We show that commutativity and essential commutativity of two slant Toeplitz operators are the same. Also, we study k th -order slant Toeplitz operators on the Bergman space L 2 a (D) and give some commuting properti

We will introduce a general notion of slant antieigenvalue and corresponding slant antieigenvector. Then we establish how that theory may be compared to, and in some sense reduced to, the standard antieigenvalue theory. Generally speaking, our point of view is to accommodate such generalized antieig