Due to factors such as limited integral terms and approximations,solving integral equations using classical numerical methods is often more challenging than solving differential equations.This paper proposes a theory of solving linear integral equations through the transformation of primitive functions using deep learning.By transforming the integrand into a primitive function,the integral equation is converted into a purely differential equation.The paper also provides a method for determining the initial conditions of the primitive function and a technique for generating the neural network loss function.After approximating the primitive function using deep learning with neural networks,the derivative of the primitive function is calculated and transformed according to the form of the integral kernel,ultimately obtaining the numerical solution of the unknown function in the integral equation.Through numerical experiments on various typical examples,the paper demonstrates that the proposed theory and key techniques exhibit good accuracy and applicability,thereby opening up new technical approaches for the numerical solution of linear integral equations.
关键词
深度学习/线性积分方程/退化核/原函数变换/损失函数/数值验证
Key words
deep learning/linear integral equation/degenerate kernel/transformation of primitive functions/loss function/numerical validation
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