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https://ah.lib.nccu.edu.tw/handle/140.119/18699
題名: | Propagation of Singularities in the Solutions to the Boltzmann Equation near Equilibrium | 作者: | 段任軍 DUAN, RENJUN 李明融 LI, MENG-RONG 楊彤 YANG, TONG |
關鍵詞: | Boltzmann equation; singularity; Maxwellian | 日期: | 七月-2008 | 上傳時間: | 24-十二月-2008 | 摘要: | This paper is about the propagation of the singularities in the solutions to the Cauchy problem of the spatially inhomogeneous Boltzmann equation with angular cutoff assumption. It is motivated by the work of Boudin–Desvillettes on the propagation of singularities in solutions near vacuum. It shows that for the solution near a global Maxwellian, singularities in the initial data propagate like the free transportation. Precisely, the solution is the sum of two parts in which one keeps the singularities of the initial data and the other one is regular with locally bounded derivatives of fractional order in some Sobolev space. In addition, the dependence of the regularity on the cross-section is also given. | 關聯: | Mathematical Models and Methods in Applied Sciences, 18(7), 1093-1114 | 資料類型: | article | DOI: | http://dx.doi.org/10.1142/S0218202508002966 |
Appears in Collections: | 期刊論文 |
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