Inspired by the relation between deep neural network (DNN) and partial
differential equations (PDEs), we study the general form of the PDE models of
deep neural networks. To achieve this goal, we formulate DNN as an evolution
operator from a simple base model. Based on several reasonable assumptions, we
prove that the evolution operator is actually determined by
convection-diffusion equation. This convection-diffusion equation model gives
mathematical explanation for several effective networks. Moreover, we show that
the convection-diffusion model improves the robustness and reduces the
Rademacher complexity. Based on the convection-diffusion equation, we design a
new training method for ResNets. Experiments validate the performance of the
proposed method