Minimal models, modular linear differential equations and modular forms of fractional weights

We show that modular forms of fractional weights on principal congruence subgroups of odd levels, which are found by T. Ibukiyama, naturally appear as characters being multiplied $\eta^{c_{\text{eff}}}$ of the so-called minimal models of type $(2, p)$, where $c_{\text{eff}}$ is the effective central charge of a minimal model. Using this fact and modular invariance property of the space of characters, we give a different proof of the result showned by Ibukiyama that is the explicit formula representing $\mathrm{SL}_{2}(\mathbb{Z})$ on the space of the ibukiyama modular forms. We also find several pairs of spaces of the Ibukiyama modular forms on $\Gamma(m)$ and $\Gamma(n)$ with $m|n$ having the property that the former are included in the latter. Finally, we construct vector-valued modular forms of weight $k\in\frac{1}{5}\mathbb{Z}_{>0}$ starting from the Ibukiyama modular forms of weight $k\in\frac{1}{5}\mathbb{Z}_{>0}$ with some multiplier system by a symmetric tensor product of this representation and show that the components functions coincides with the solution space of some monic modular linear differential equation of weight $k$ and the order $1+5k$.