钢笔记下惩罚
发表于 2025-4-1 02:11:09
https://doi.org/10.1007/978-90-481-9577-0Boundary value problem; Finite; Fundament; calculus; mathematics; optimization; structure; theorem; partial
赏心悦目
发表于 2025-4-1 09:02:27
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overwrought
发表于 2025-4-1 12:07:44
https://doi.org/10.1007/978-3-642-55519-0Many problems of classical mechanics are variational in nature, but not convex. This paper shows how the duality theory of convex optimization can be extended to classical mechanics. It is shown in particular that there is a duality theory for functions of square matrices which factor through the determinant.
平静生活
发表于 2025-4-1 16:41:36
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Nostalgia
发表于 2025-4-1 20:25:48
https://doi.org/10.1007/978-3-322-94840-3This paper describes dual formulations of two entropy optimization principles, Jaynes’ maximum entropy and Kullback-Leibler’s minimum cross-entropy principles. Particular emphases are given to their applications in various optimization problems such as minimax, complementarity and nonlinear programming problems.
Champion
发表于 2025-4-1 23:08:42
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灿烂
发表于 2025-4-2 05:47:41
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手榴弹
发表于 2025-4-2 08:33:13
Non-Convex Duality,Many problems of classical mechanics are variational in nature, but not convex. This paper shows how the duality theory of convex optimization can be extended to classical mechanics. It is shown in particular that there is a duality theory for functions of square matrices which factor through the determinant.