On homological properties of the category of F1-representations over a linear quiver of type An
Abstract
Let Q be a quiver of type An with linear orientation and rep(Q,F1) the category of representations of Q over the virtual field F1.It is proved that rep(Q,F1) has global dimension 2 whenever n≥ 3 and it is hereditary if n≤ 2. As a consequence, the Euler form L, M=Σi=0∞ (-1)idim Exti(L,M) is well-defined. However, it does not descend to the Grothendieck group of rep(Q,F1). This yields negative answers to questions raised by Szczesny in [IMRN, Vol. 2012, No. 10, pp. 237-2404].
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