English

Dimension vectors with the equal kernels property

Representation Theory 2020-03-17 v1

Abstract

Let rNr \in \mathbb N, Γr\Gamma_r be the generalized Kronecker quiver with rr arrows γ1,,γr ⁣:12\gamma_1,\ldots,\gamma_r \colon 1 \to 2 and δΔ+(Γr)\delta \in \Delta_+(\Gamma_r) be a positive root of Γr\Gamma_r. We say that δ\delta has the equal kernels property if for all αkr{0}\alpha \in k^r \setminus \{0\} and every indecomposable representation MM with dimension vector dimM=δ\underline{dim} M = \delta the kk-linear map Mα:=i=1rαiM(γi) ⁣:M1M2M^\alpha := \sum^r_{i=1} \alpha_i M(\gamma_i) \colon M_1 \to M_2 is injective. We show that δ\delta has the equal kernels property if and only if qΓr(δ)+δ2δ11q_{\Gamma_r}(\delta) + \delta_2 - \delta_1 \geq 1, where qΓr ⁣:Z2Z,(x,y)x2+y2rxyq_{\Gamma_r} \colon \mathbb Z^2 \to \mathbb Z, (x,y) \mapsto x^2 + y^2 - rxy denotes the Tits quadratic form of Γr\Gamma_r.

Keywords

Cite

@article{arxiv.2003.07175,
  title  = {Dimension vectors with the equal kernels property},
  author = {Daniel Bissinger},
  journal= {arXiv preprint arXiv:2003.07175},
  year   = {2020}
}

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R2 v1 2026-06-23T14:16:05.414Z