Strongly zero-product preserving maps on normed algebras induced by a bounded linear functional (Q2800610)

Let \(A\) and \(B\) be normed algebras over \(\mathbb{C}\). The author introduces the notion of a strongly zero-product preserving map. A linear map \(T : A \to B\) is said to be a strongly zero-product preserving map if, for any pair of sequences \(\{x _n\} \) and \(\{y_n\}\) in \(A\) such that \(\lim_{n \to \infty} x_n y_n =0\), it follows that \(\lim_{n \to \infty} T(x_n)T(y_n)=0\).NEWLINENEWLINEGiven a vector space \(V\) and a non-zero linear functional \(f \in V^\ast\), we can consider the associative algebra \(V_f\) with product NEWLINE\[NEWLINE a\cdot b= f(a) b \quad (a,b \in V). NEWLINE\]NEWLINE In this paper, the author characterizes the zero-product and strongly zero-product preserving maps on \(V_f\). The corresponding notion for the Jordan product is also considered.