A deep learning initialized iterative method for Navier-Stokes Darcy model

A deep learning initialized iterative (Int-Deep) method is developed for numerically solving Navier-Stokes Darcy model. For this purpose, Newton iterative method is mentioned for solving the relative finite element discretized problem. It is proved that this method converges quadratically with the convergence rate independent of the finite element mesh size under certain standard conditions. Later on, a deep learning algorithm is proposed for solving this nonlinear coupled problem. Following the ideas of an earlier work by Huang, Wang and Yang (2020), an Int-Deep algorithm is constructed for the previous problem in order to further improve the computational efficiency. A series of numerical examples are reported to confirm that the Int-Deep algorithm converges to the true solution rapidly and is robust with respect to the physical parameters in the model.