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引用次数: 0
摘要
本文在广义高斯概率空间的框架内深入研究了(L_p\)明考夫斯基问题。这类概率空间最初是通过卢特瓦克等人的开创性著作(Ann Probab 32(1B):757-774, 2004, IEEE Trans Inf Theory 51(2):473-478, 2005)以及卢特瓦克等人的著作(IEEE Trans Inf Theory 58(3):1319-1327, 2012)引入信息论的。本文的主要重点在于研究这一问题的存在。虽然本文采用了变分法来探讨当 \(p \in \mathbb {R} \setminus \{0\})时归一化闵科夫斯基问题存在的必要条件和充分条件,但我们的主要重点是研究没有归一化要求的广义高斯闵科夫斯基问题的存在性,尤其是在\(p \ge 1\) 的光滑类别中。
This article delves into the \(L_p\) Minkowski problem within the framework of generalized Gaussian probability space. This type of probability space was initially introduced in information theory through the seminal works of Lutwak et al. (Ann Probab 32(1B):757–774, 2004, IEEE Trans Inf Theory 51(2):473–478, 2005), as well as by Lutwak et al. (IEEE Trans Inf Theory 58(3):1319–1327, 2012). The primary focus of this article lies in examining the existence of this problem. While the variational method is employed to explore the necessary and sufficient conditions for the existence of the normalized Minkowski problem when \(p \in \mathbb {R} \setminus \{0\}\), our main emphasis is on the existence of the generalized Gaussian Minkowski problem without the normalization requirement, particularly in the smooth category for \(p \ge 1\).
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