algebraic multiplicity
- algebraic multiplicity的基本解释
-
-
代数重度
- 更多网络例句与algebraic multiplicity相关的网络例句 [注:此内容来源于网络,仅供参考]
-
This paper discussed the algebraic multiplicity of the complex eigenvalues of population operator.
讨论了人口算子复本征值的代数重数问题。
-
We will obtain that 0 is an eigenvalue of the operator corresponding to the model with geometric and algebraic multiplicity one.
第三节中研究对应于该排队模型主算子的谱特征,得到0是该主算子及其共轭算子几何重数与代数重数为1的特征值。
-
First we prove that all points on the imaginary axis except for zero belong to the resolvent set of the operator corresponding to the model, second prove that 0 is an eigenvalue of the operator and its adjoint operator with geometric multiplicity and algebraic multiplicity one,last by using theabove results we obtain that the time-dependent solution of the model str.
首先证明在虚轴上除了0以外其他所有点都属于该算子的豫解集,其次证明0是对应于该系统的主算子及其共轭算子的几何与代数重数为1的特征值,由此推出该系统的时间依赖解当时刻趋向于无穷时强收敛于系统的稳态解。
-
It obtains that the transport operator A has no complex eigenvalue s, and the spectrum of the transport operator A consists of finite real isolated eigenvalues which have a finite algebraic multiplicity in trip Pas.
本文研究了板几何中一类具各向异性、单能、均匀介质迁移算子A的谱,得出了该算子A在带域Pas中无复本征值和由有限个具有限代数重数的实离散本征值组成等结果。
-
It obtains that the transport operator A has no complex eigenvalue s,and the spectrum of the transport operator A consists of finite real isolated eigenvalues which have a finite algebraic multiplicity in trip Pas.
本文研究了板几何中一类具各向异性、连续能量、均匀介质的迁移算子的谱,得出了该算子A在带域Pas中无复本征值和由有限个具有限代数重数的实离散本征值组成等结果。
- 加载更多网络例句 (2)
- 更多网络解释与algebraic multiplicity相关的网络解释 [注:此内容来源于网络,仅供参考]
-
algebraic multiplicity:代数重度
algebraic logic of pocket calculator 袖珍计算机的代数逻辑 | algebraic multiplicity 代数重度 | algebraic number 代数数