A New Counterexample to Nguyen's Conjecture on Surface Fibration

Suppose $f:S\rightarrow\mathbb{P}^1$ is a surface fibration of genus $g$ with $3$ singular fibers and two of the fibers are semistable. In 1998, K. V. Nguyen conjectured that such kind of fibration does not exist for $g\ge2$. But in 2013, C. Gong, X. Lu, and S.-L. Tan found a counterexample to Nguyen's conjecture for $g=2$. Note that such kind of fibration shows strong arithmetic properties, and as such the counterexamples are important, but rare in fact. In this paper, a new counterexample to Nguyen's conjecture for $g=2$ is constructed.