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Fernando Muro
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The kernel of the morphism from the Picard group to the stable Picard group of a self-injective algebra

Let $\Lambda$ be a finite-dimensional self-injective algebra (over an algebraically closed field, if necessary). Let $Pic(\Lambda)$ be the group of natural isomorphism classes of self-equivalences $mod(\Lambda)\rightarrow mod(\Lambda)$ of the category $mod(\Lambda)$ of finite-dimensional right $\Lambda$-modules. Similarly, let $StPic(\Lambda)$ be the group of natural isomorphism classes of self-equivalences $\underline{mod}(\Lambda)\rightarrow \underline{mod}(\Lambda)$ of the stable category $\underline{mod}(\Lambda)$ of finite-dimensional right $\Lambda$-modules. What can we say about the kernel of the obvious morphism $Pic(\Lambda)\rightarrow StPic(\Lambda)$? Is there any known example of non-trivial element in the kernel? I'm particularly interested in the case of $\Lambda$ being of finite representation type.

Fernando Muro
  • 15.2k
  • 2
  • 49
  • 78