Minimal generating system of Ringel-Hall algebras of affine valued quivers. (Q2491815)

Let \(Q=(Q,\mathbf d)\) be an~affine valued quiver, \(\mathbb{F}_q\) be a~finite field and let \(A\) be a~finite dimensional hereditary \(\mathbb{F}_q\)-algebra of type \(Q\) (i.e., \(A\) is a~tensor algebra of a~reduced \(\mathbb{F}_q\)-species of type \(Q\)). Consider the Ringel-Hall algebra \(\mathfrak h(A)\) of the algebra \(A\). In the paper, the author answers the following questions. (1) How does one classify all indecomposable \(A\)-modules \(M\) which can be generated inside \(\mathfrak h(A)\) by some \(A\)-modules with strictly smaller dimensions? (2) How does one write down explicit systems of minimal homogeneous generators of \(\mathfrak h(A)\)? The results of this paper extend the results given by \textit{P. Zhang}, \textit{Y.-B. Zhang} and \textit{J.-Y. Guo} [in J. Algebra 239, No. 2, 675-704 (2001; Zbl 1036.16014)], where the authors considered questions (1) and (2) for the affine quivers \(\widetilde\mathbb{A}_n\), \(\widetilde\mathbb{D}_n\), \(\widetilde\mathbb{E}_6\), \(\widetilde\mathbb{E}_7\) and \(\widetilde\mathbb{E}_8\).