简介:Thispaperaimstogivesomeexamplesofdiffeomorphic(orhomeomorphic)lowdimensionalcompleteintersections,whichcanbeconsideredasageometricalrealizationofclassificationtheoremsaboutcompleteintersections.AconjectureofLibgoberandWood(1982)willbeconfirmedbyoneoftheexamples.
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简介:除了在1-slim,解决方案Ut(x)为所有起始的值在牛肉熏香肠空格与一个向量领域联系了的作者构造设置了并且获得向量领域与低整齐是未必围住的一个斜伴随的操作符和非线性的部分的和的1-quasi-sure流动性质,也就是单一的可辨性。而且,在答案导致的牛肉熏香肠空间的转变下面的能力的等价被获得。
简介:在这个工作,我们证明Benney-Lin方程ut+uxxx+β(uxx+uxxxx)+ηuxxxxx+uux=0(x∈ℝ,t≥0),在此β>0并且η∈ℝ,在Sobolev空格H为s≥的s(R)−7/5。我们使用证明这结果是双线性的估计方法的方法由Bourgain开始了。
简介:我们在一半上为好Boussinesq方程学习一个initial-boundary-value问题线
Geometrical Realization of Low-Dimensional Complete Intersections
Boundedness with of Solutions for Low Regularity Duffing Equation in Time
Quasi-sure Flows Associated with Vector Fields of Low Regularity
On Cauchy Problem of the Benney-Lin Equation with Low Regularity Initial Data
Low Regularity Solution of the Initial-Boundary-Value Problem for the "Good" Boussinesq Equation on the Half Line