Existence, uniqueness, and universality of global dynamics for the fractional hyperbolic $\Phi^4_3$-model

We study the fractional $\Phi^4_3$-measure (with order $\alpha > 1$) and the dynamical problem of its canonical stochastic quantization: the three-dimensional stochastic damped fractional nonlinear wave equation with a cubic nonlinearity, also called the fractional hyperbolic $\Phi^4_3$-model. We first construct the fractional $\Phi^4_3$-measure via the variational approach by Barashkov-Gubinelli (2020). When $\alpha \leq \frac{9}{8}$, this fractional $\Phi^4_3$-measure turns out to be mutually singular with respect to the base Gaussian measure. We then prove almost sure global well-posedness of the fractional hyperbolic $\Phi^4_3$-model and invariance of the fractional $\Phi^4_3$-measure for all $\alpha > 1$ by further developing the globalization framework due to Oh-Okamoto-Tolomeo (2021) on the hyperbolic $\Phi^3_3$-model. Furthermore, when $\alpha > \frac{9}{8}$ , we prove weak universality of the fractional hyperbolic $\Phi^4_3$-model via both measure convergence and dynamical convergence.