Numerical solving of generalized Black-Scholes differential equation using deep learning based on blocked residual connection

Option pricing in the financial derivatives market is worth studying. When the volatility and the rate of return are not fixed in Blacks-Scholes (BS) equation, the analytical form of the solution is difficult to be obtained. In this paper, we propose deep learning based on blocked residual connection method (DLBR) for the numerical solving of BS equations. The validity period and inventory price are the inputs of the network, while the option price is the solution. Neurons on the multiple hidden layers are processed in blocks and each block is connected to the residuals. The boundary conditions are constructed as a part of the numerical solution and the loss function is minimized to obtain the optimal network parameters. The DLBR method has strong applicability and overcomes the shortcomings of extreme learning machines. Three experiment calculated the numerical solution of the BS equation about European options and promoted the option pricing model. Compared with the existing algorithms such as finite element method and physics-informed neural networks (PINN) method, the obtained numerical solution has higher precision and smaller error, which shows the feasibility and superiority of the proposed method.