Bridgeland walls destabilizing one-dimensional space sheaves

Abstract

Following the setup proposed by Jardim-Maciocia-Martinez in the case of the projective space, we study some numerical and actual Bridgeland walls for the (twisted) Chern character v=(-R,0,D,0) in certain half-plane of stability conditions, where walls are nested and finite. We give bounds for the largest numerical wall that may appear. When R=0, these bounds in particular produce the first known bounds for the Gieseker chamber in the case of a threefold. We also study the cases R=0 and D=3,4 in detail using a small algorithm in Python.

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