English

Monomorphism operator and perpendicular operator

Representation Theory 2013-01-15 v1

Abstract

For a quiver QQ, a kk-algebra AA, and a full subcategory X\mathcal X of AA-mod, the monomorphism category Mon(Q,X){\rm Mon}(Q, \mathcal X) is introduced. The main result says that if TT is an AA-module such that there is an exact sequence 0Tm...T0D(AA)00\rightarrow T_m\rightarrow...\rightarrow T_0\rightarrow D(A_A)\rightarrow 0 with each Tiadd(T)T_i\in {\rm add} (T), then Mon(Q, T)= (kQkT){\rm Mon}(Q, \ ^\perp T) = \ ^\perp (kQ\otimes_k T); and if TT is cotilting, then kQkTkQ\otimes_k T is a unique cotilting \m\m-module, up to multiplicities of indecomposable direct summands, such that Mon(Q, T)= (kQkT){\rm Mon}(Q, \ ^\perp T)= \ ^\perp (kQ \otimes_k T). As applications, the category of the Gorenstein-projective (kQkA)(kQ\otimes_kA)-modules is characterized as Mon(Q,GP(A)){\rm Mon}(Q, \mathcal{GP}(A)) if AA is Gorenstein; the contravariantly finiteness of Mon(Q,X){\rm Mon}(Q, \mathcal X) can be described; and a sufficient and necessary condition for Mon(Q,A){\rm Mon}(Q, A) being of finite type is given.

Keywords

Cite

@article{arxiv.1301.2853,
  title  = {Monomorphism operator and perpendicular operator},
  author = {Keyan Song and Pu Zhang},
  journal= {arXiv preprint arXiv:1301.2853},
  year   = {2013}
}
R2 v1 2026-06-21T23:08:38.654Z