低能儿
发表于 2025-3-26 21:17:14
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果核
发表于 2025-3-27 03:11:49
Biodegradation of Nitroaromatics by Microbes here covered, many of which have counterparts in Lagrangian Aubry-Mather theory. Our first step, nevertheless, consists in an attempt of placing ergodic optimization in the mathematical and physical research scenario.
狼群
发表于 2025-3-27 07:19:27
Improving Plants for Zinc Acquisition, In this chapter, some alternative expressions that could be considered to define the ergodic maximizing value are brought to the attention of the reader. Furthermore, a proof of the dual formula is provided.
CORE
发表于 2025-3-27 13:22:18
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扔掉掐死你
发表于 2025-3-27 16:41:30
Biosorption of Ni(II) Using Seeds of ials that are not cohomologous to a constant, the separating sub-actions explicitly constructed in the previous chapter are quite particular and actually represent a small part of the whole set of Lipschitz continuous separating sub-actions.
preeclampsia
发表于 2025-3-27 18:33:46
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Endemic
发表于 2025-3-27 23:36:57
Duality,ions. Since the earliest works in ergodic optimization theory, it became clear however that this constant can be presented in various equivalent ways. In this chapter, some alternative expressions that could be considered to define the ergodic maximizing value are brought to the attention of the rea
合唱团
发表于 2025-3-28 03:49:27
Calibrated Sub-actions,ill show that calibrated sub-actions do exist and can be obtained as solutions of a Lax-Oleinik fixed point problem. Instead making use of a version of the classical Schauder-Tychonoff fixed point theorem, we apply a result due to Ishikawa regarding an iteration process for approximating fixed point
不能妥协
发表于 2025-3-28 09:27:12
Aubry Set,e first notion we present is the Aubry set, the part of the non-wandering set that characterizes the maximizing probabilities. Roughly speaking, the Aubry set is formed by the non-wandering points whose orbits have maximal Birkhoff sums. In the sequel, we give the precise definition and some example
内向者
发表于 2025-3-28 14:08:32
,Mañé Potential and Peierls Barrier,onals will be available in ergodic optimization theory. The concepts that will be discussed in this chapter, namely, the Peierls barrier and the Mañé potential go back to the contributions of both Mather and Mañé in Lagrangian systems.