Mathematics – Representation Theory
Scientific paper
2009-10-11
Mathematics
Representation Theory
35 pages
Scientific paper
We present a sum-product formula for the classical Hall polynomial which is based on tableaux that have been introduced by T. Klein in 1969. In the formula, each summand corresponds to a Klein tableau, while the product is taken over the cardinalities of automorphism groups of short exact sequences which are derived from the tableau. For each such sequence, one can read off from the tableau the summands in an indecomposable decomposition, and the size of their homomorphism and automorphism groups. Klein tableaux are refinements of Littlewood-Richardson tableaux in the sense that each entry $\ell \geq 2$ carries a subscript $r$. We describe module theoretic and categorical properties shared by short exact sequences which have the same symbol $\ell_r$ in a given row in their Klein tableau. Moreover, we determine the interval in the Auslander-Reiten quiver in which indecomposable sequences of $p^n$-bounded groups which carry such a symbol occur.
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