The 2d O(3) model is widely used as a toy model for ferromagnetism and for Quantum Chromodynamics. With the latter it shares --- among other basic aspects --- the property that the continuum functional integral splits into topological sectors. Topology can also be defined in its lattice regularised version, but semi-classical arguments suggest that the topological susceptibility $chi_{rm t}$ does not scale towards a finite continuum limit. Previous numerical studies confirmed that the quantity $chi_{rm t}, xi^{2}$ diverges at large correlation length $xi$. Here we investigate the question whether or not this divergence persists when the configurations are smoothened by the Gradient Flow (GF). The GF destroys part of the topological windings; on fine lattices this strongly reduces $chi_{rm t}$. However, even when the flow time is so long that the GF impact range --- or smoothing radius --- attains $xi/2$, we do still not observe evidence of continuum scaling.
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