Abstract: Conlon-Rochon, Y. Li and Szekelyhidi independently constructed the first examples of Calabi-Yau metrics on C^n with maximal volume growth and singular tangent cones at infinity. In this talk, I will discuss a new family of Calabi-Yau metrics on C^3 asymptotic to C x A2, where A2 is the two dimensional A2 singularity equipped with the flat cone metric. These metrics are distinct in the sense that any two of them are not related by scaling and isometry. I will also discuss a refinement of a conjecture of Szekelyhidi about the classification of such metrics.