数学
班级(哲学)
正多边形
订单(交换)
静止点
数学分析
应用数学
几何学
财务
计算机科学
人工智能
经济
作者
Haifan Chen,Guozhi Dong,José A. Iglesias,Wei Liu,Ziqing Xie
摘要
This paper contributes to the exploration of a recently introduced computational paradigm known as second-order flows, which are characterized by novel dissipative hyperbolic partial differential equations extending accelerated gradient flows to energy functionals defined on Sobolev spaces, and exhibiting significant performance particularly for the minimization of nonconvex energies. Our approach hinges upon convex-splitting schemes, a tool which is not only pivotal for clarifying the well-posedness of second-order flows, but also yields a versatile array of robust numerical schemes through temporal (and spatial) discretization. We prove the convergence to stationary points of such schemes in the semidiscrete setting. Further, we establish their convergence to time-continuous solutions as the timestep tends to zero. Finally, these algorithms undergo thorough testing and validation in approaching stationary points of representative nonconvex variational models in scientific computing.
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