Dynamics of stochastic modified Boussinesq approximation equation driven by fractional Brownian motion

The current paper is devoted to stochastic modified Boussinesq approximation equation driven by fractional Brownian motion with H is an element of (1/4, 1/2). Based on the different diffusion operators P Delta(2) and -Delta in stochastic systems, we combine two types operators Phi(1) = I and a Hilbert-Schmidt operator Phi(2) = Phi to guarantee the convergence of the corresponding Wiener-type stochastic integrals, and show the existence and regularity of the stochastic convolution corresponding to the stochastic modified Boussinesq approximation equation. By the Banach modified fixed point theorem in the selected intersection space, the existence and uniqueness of global mild solution are obtained. Finally, the existence of a random attractor for the random dynamical system generated by the mild solution for the modified Boussinesq approximation equation is also established.