On continuous multiplicative mappings on analytic sequence spaces (Q2733907)

It is well known that the analytic sequence spaces NEWLINE\[NEWLINEA:= \Biggl\{x= (x_k) \Biggl|\sum_k x_kz^k\text{ converges for }|z|< 1\Biggr\}NEWLINE\]NEWLINE and NEWLINE\[NEWLINEB:= \Biggl\{x= (x_k) \Biggl|\sum_k x_kz^k\text{ converges for }|z|> 1\Biggr\}NEWLINE\]NEWLINE provided with their normal topologies are respectively an FK-space and an LFK-space [see \textit{K.-G. Grosse-Erdmann}, Math. Z. 209, No. 4, 499-510 (1992; Zbl 0782.46012)]. The authors show that the both spaces are locally multiplicatively convex algebras under the convolution product and prove that each non-zero continuous multiplicative linear functional \(f\) on \(A\) on \(B\) is given by formula \(f(x)= \sum_n x_n\rho^n\) with \(|\rho|< 1\) and \(|\rho|\leq 1\), respectively. The continuous linear multiplicative mappings between those two algebras are characterized.