We study a family of Fourier integral operators whose symbol and phase function satisfy a multi-parameter characteristics. We consider symbol function $\sigma(x,y,\xi)$ with compact support in $~(x,y)$ and such that $|\partial_\xi^\alpha\partial_{x,y}^\beta\sigma(x,y,\xi)|\le \mathfrak{C} (1+|\xi|)^m\prod_{i=1}^n(1+|\xi^i|)^{-\alpha_i}$. We require that phase function $\Phi(x,\xi)=\Phi_1(x^1,\xi^1)+\Phi_2(x^2,\xi^2)+\cdots+\Phi_n(x^n,\xi^n)~$, and each of them satisfies the same conditions as before. As a result, we get a desired better $L^p$-regularity result.
Comment: The second author does not approve