The \(\ell\)-translativity of Abel-type matrix (Q1567231)

Let \(A=(a_{nk})\) be an infinite matrix defining the transformation \((Ax)_n =\sum_{k=0}^{\infty} a_{nk}x_k\), where \(x=(x_n)\) is a complex number sequence. Let \(\ell\) and \(\ell(A)\) be the sets of all complex sequences \(y=(y_k)_{k\geq 0}\) such that \(\sum_{k=0}^{\infty} |y_k|\) converges and \(Ay\in \ell\), respectively. The matrix \(A\) is called an \(\ell - \ell\) matrix if for every \(x\in \ell\) one has \(Ax\in \ell\). Furthermore, the matrix \(A\) is said to be \(\ell\)-translative for the sequence \(y\in \ell(A)\) if \(T_y=(y_1,y_2,y_3,\dots{}) \in \ell(A)\) and \(S_y=(0,y_0,y_1,y_2,\dots{}) \in \ell(A)\). The author investigates these concepts in case of certain special matrices, called Abel-type matrices \(A_{\alpha, t}\) introduced by him.