基于二次算子族的无界Hamilton算子根向量组的基性质
发布时间:2022-12-18 09:05
利用无界Hamilton算子导出的二次算子族,本文研究了一类无界Hamilton算子根向量组的Schauder基性质.首先,建立了无界Hamilton算子的根向量与相应的二次算子族的根向量之间的关系.其次,借助二次算子族谱的相关性质,刻画了无界Hamilton算子的本征值分布以及本征值的代数指标,并得到了无界Hamilton算子的根向量组是某个Hilbert空间的一个块状Schauder基的充要条件.最后,将所得结果应用于矩形薄板弯曲问题.
【文章页数】:20 页
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本文编号:3721777
【文章页数】:20 页
【参考文献】:
期刊论文
[1]A-Weyl定理及其摄动[J]. 董炯,曹小红,刘俊慧. 数学学报(中文版). 2017(06)
[2]一类无界算子矩阵根子空间的完备性[J]. 吴德玉,阿拉坦仓. 中国科学:数学. 2016(04)
[3]一类无穷维Hamilton算子谱的刻画[J]. 邢利刚,阿拉坦仓. 应用数学学报. 2014(04)
[4]上三角算子矩阵Browder谱的注记(英文)[J]. 张海燕,杜鸿科. 数学进展. 2013(05)
[5]二次算子族及非负无穷维Hamilton算子的谱分布[J]. 邢利刚,阿拉坦仓. 数学学报. 2012(04)
[6]无穷维Hamilton算子广义本征函数系的完备性及其在弹性力学中的应用[J]. 侯国林,阿拉坦仓. 中国科学:数学. 2012(01)
[7]SEMI-INVERSE METHOD AND GENERALIZED VARIATIONAL PRINCIPLES WITH MULTI-VARIABLES IN ELASTICITY[J]. 何吉欢. Applied Mathematics and Mechanics(English Edition). 2000(07)
[8]NEW SOLUTION SYSTEM FOR CIRCULAR SECTOR PLATE BENDING AND ITS APPLICATION[J]. Yao Weian Zhong Wanxie Su Bin (State Key Laboratory of Structural Analysis of Industrial Equipment,Dalian University of Technology,Dalian 116023,Chian). Acta Mechanica Solida Sinica. 1999(04)
[9]THE HAMILTONIAN SYSTEM AND COMPLETENESS OF SYMPLECTIC ORTHOGONAL SYSTEM[J]. 张鸿庆,阿拉坦仓,钟万勰. Applied Mathematics and Mechanics(English Edition). 1997(03)
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