Strichartz and local smoothing estimates for stochastic dispersive equations with linear multiplicative noise

We study a quite general class of stochastic dispersive equations with linear multiplicative noise, including especially the Schr\"odinger and Airy equations. The pathwise Strichartz and local smoothing estimates are derived here in both the conservative and nonconservative case. In particular, we obtain the P-integrability of constants in these estimates, where P is the underlying probability measure. Several applications are given to nonlinear problems, including local well-posedness of stochastic nonlinear Schr\"odinger equations with variable coefficients and lower order perturbations, integrability of global solutions to stochastic nonlinear Schr\"odinger equations with constant coefficients. As another consequence, we prove as well the large deviation principle for the small noise asymptotics.