共查询到17条相似文献,搜索用时 46 毫秒
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给定Hilbert空间L2[a,∞)上两个由2n阶对称微分算式生成的微分算子Li(i=1,2),该文给出了乘积算子L2L1是自伴算子的一个充分必要条件. 相似文献
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极限点型 Sturm-Liouville 算子乘积的自伴性 总被引:1,自引:0,他引:1
假设微分算式l(y)=-(py') qy,t∈[a,∞),满足lk(y)(k=1,2,3)均为极限点型,作者研究了由l(y)生成的两个微分算子Li(i=1,2)的乘积L2L1的自伴性问题并获得其自伴的充分必要条件.同时研究了由l(y)=-y" qy,t∈[a,∞),生成的三个微分算子Li(i=1,2,3)的乘积L3L2L1的自伴性问题. 相似文献
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本文研究一类带有内部奇异点的n阶复值系数对称微分算式ty=Σnaj(t)y(j)(t)乘积的自共轭域描述问题.通过构造相应的直和空间,应用直和空间的相关理论,在直和空间上生成的相应于l的最小算子T0(l)的正则型域Π(T0(l))满足(-r,r)■Π(T0(l))∩R及l2在直和空间中是部分分离的条件下,利用微分方程ly=±λy的解给出l2的自共轭域的完全解析描述,并且确定自共轭边界条件的矩阵仅由微分方程的解在正则点的初始值决定,其中0相似文献
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考虑区间(a,b)上的两端奇异n阶复值系数对称微分算式ly=∑n j=0aj(t)y(j)(t),在其最小算子的实正则型域为Π(T0(l))∩R=(-1,1)及l2 y在L2(a,c]与L2[c,b)中均是部分分离的条件下(c∈(a,b)是任意固定正则点),利用微分方程ly=±λ0y与ly=±μ0y的L2(a,b)解给出微分算式l2 y在区间(a,b)上的自共轭域的完全解析描述,其中λ0,μ0∈Π(T0(l))∩R,λ0,μ0≠0. 相似文献
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王红军赵佳 《应用泛函分析学报》2020,(4):207-218
本文研究了度量图上二阶及四阶局部微分算子积的自伴顶点条件.在研究闭区间[a,b]上积算子自伴性的基础上,运用度量图上高阶局部微分算子的自伴顶点条件得到了积算子自伴的充分必要条件.此外,给出了积算子自伴与原算子自伴之间的关系. 相似文献
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二阶微分算子积的自伴性 总被引:4,自引:0,他引:4
本文讨论了由正则和奇异的二阶对称微分算式生成的微分算子的积算子的自伴性,得到了积算子为自伴算子时边条件应满足的充分而必要的条件及若干其他结果. 相似文献
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奇异向量微分算子的自伴域 总被引:1,自引:0,他引:1
本文在向量值函数空间中,推广应用最大算子域的直和分解法,讨论奇异向量微分算子的自伴扩张问题,给出了奇异形式对称向量微分算式一切自伴扩张域的完全描述,概括了[1—4]的相应结果. 相似文献
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考虑[a,b](-∞<a<b<∞)上n阶复值系数正则对称微分算式ly=∑n j=0 aj(t)y(j).本文首先给出由lmy(m∈N且m≥2)生成的微分算子T(lm)自伴边条件一种新的描述,其次研究了由微分算式ly生成的m个微分算子Tk(l)(k=1,…,m)的积Tm(l)…T2(l)T1(l)的自伴性并获得其自伴的充分必要条件. 相似文献
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In this paper, the problem of self-adjointness of the product of two differential operators is considered. A number of results
concerning self-adjointness of the productL
2
L
1 of two second-order self-adjoint differential operators are obtained by using the general construction theory of self-adjoint
extensions of ordinary differential operators.
Supported by the Royal Society and the National Natural Science Foundation of China and the Regional Science Foundation of
Inner Mongolia 相似文献
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Existence results for problems with monotone nonlinear boundary conditions obtained in the previous publications by the author for functional differential equations are transferred to the case of nonconvex differential inclusions with the help of the selection theorem due to A. Bressan and G. Colombo. 相似文献
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Riesz basis analysis for a class of general second-order partial differential equation systems with nonseparated boundary conditions is conducted. Using the modern spectral analysis approach for parameterized ordinary differential operators, it is shown that the Riesz basis property holds for the general system if its associated characteristic equation is strongly regular. The Riesz basis property can then be readily established in a unified manner for many one-dimensional second-order systems such as linear string and beam equations with collocated or noncollocated boundary feedbacks and tip mass attached systems. Three demonstrative examples are presented. 相似文献