摘要
This paper is concerned with a novel deep learning method for variational problems with essential boundary conditions.To this end,wefirst reformulate the original problem into a minimax problem corresponding to a feasible augmented La-grangian,which can be solved by the augmented Lagrangian method in an infinite dimensional setting.Based on this,by expressing the primal and dual variables with two individual deep neural network functions,we present an augmented Lagrangian deep learning method for which the parameters are trained by the stochastic optimiza-tion method together with a projection technique.Compared to the traditional penalty method,the new method admits two main advantages:i)the choice of the penalty parameter isflexible and robust,and ii)the numerical solution is more accurate in the same magnitude of computational cost.As typical applications,we apply the new ap-proach to solve elliptic problems and(nonlinear)eigenvalue problems with essential boundary conditions,and numerical experiments are presented to show the effective-ness of the new method.
基金
supported by the National Key Research and Development Project(Grant No.2020YFA0709800)
NSFC(Grant No.12071289)
Shanghai Municipal Science and Technology Major Project(2021SHZDZX0102)
supported by the National Key R&D Program of China(2020YFA0712000)
NSFC(under grant numbers 11822111,11688101)
the science challenge project(No.TZ2018001)
youth innovation promotion association(CAS).