We produce local Calabi-Yau metrics on C2 with conical singularities along three or more complex lines through the origin whose cone angles strictly violate the Troyanov condition. The tangent cone at the origin is a flat Kähler cone with conical singularities along two intersecting lines: one with cone angle corresponding to the line with smallest cone angle, while the other forms as the collision of the remaining lines into a single conical line. Using a branched covering argument, we can construct Calabi-Yau metrics with cone singularities along cuspidal curves with cone angle in the unstable range.
This is the accepted version of the following article: de Borbon, M. and Edwards, G. (2022), Calabi-Yau metrics with cone singularities along intersecting complex lines: The unstable case. J. London Math. Soc., 105: 2167-2202. https://doi.org/10.1112/jlms.12558, which has been published in final form at https://doi.org/10.1112/jlms.12558.