Anna Dall’Acqua, Marius Müller, Shinya Okabe, Kensuke Yoshizawa
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引用次数: 0
摘要
在本文中,我们考虑了具有固定端点的图形曲线间 p 弹性能量广义的障碍问题。考虑到欧拉-拉格朗日方程具有退化性,我们探讨了解是否具有平坦部分的问题,即曲率消失的开放区间。我们还研究了导致正则性丧失的主要原因:障碍还是退化。此外,我们还给出了几个关于障碍的条件,以确保解的存在和不存在。在 p-elastica 函数的特殊情况下,我们可以细化分析,得到对称最小值的尖锐存在性结果和唯一性。
In this paper we consider an obstacle problem for a generalization of the p-elastic energy among graphical curves with fixed ends. Taking into account that the Euler–Lagrange equation has a degeneracy, we address the question whether solutions have a flat part, i.e. an open interval where the curvature vanishes. We also investigate which is the main cause of the loss of regularity, the obstacle or the degeneracy. Moreover, we give several conditions on the obstacle that assure existence and nonexistence of solutions. The analysis can be refined in the special case of the p-elastica functional, where we obtain sharp existence results and uniqueness for symmetric minimizers.
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