1) mapping
特征多边形和特征网格
2) character
特征特征
3) characteristic
特征
1.
The Types & Characteristics of Rattan Furniture Patterns;
藤家具图案纹样类型及特征
2.
Discussion on Characteristic of Loose Subsidence Pillar and Harmfulness to Producing in Malan Coal Mine;
马兰矿松散陷落柱特征及对生产危害性分析
3.
Study on some characteristics of the investment decision in coal engineering projects;
煤炭工程项目投资决策特征研究
4) character
特征
1.
The Analysis of Environmental and Economic Character of Industry in Three-gay Area;
三峡地区工业行业环境与经济行为特征分析
2.
Character and origin of eluvial deposits between the copper ore layers at Dongxiang mining area;
江西东乡铜矿层间溶蚀残积堆积物的特征及成因
3.
Study the Characteristics of AE Temporal Sequences in the Process of Failure and Deformation of Rock;
岩体破裂变形过程中AE时序特征研究
5) feature
特征
1.
Nonlinear percolation feature of low permeability reservoirs and its effect;
低渗油藏非线性渗流特征及其影响
2.
The features and operating technique of Chinese uncooked wheat koji;
我国生麦制曲特征和操作技艺
3.
The Process Planning of Refine Casting Mould to Turbine Blade Based on Feature and Operation;
基于操作与精铸模特征的工艺规程设计
6) Characteristics
特征
1.
Basical characteristics of lead-zinc mineral resources and the vista on geological prospecteing of super large scale lead-zinc deposits in Yunnan;
云南铅锌资源基本特征及超大型铅锌矿床找矿前景
2.
Characteristics and Mutative Law of Smoking Qualities of Flue-cured Tobacco from the Chiefly Producing Area in Hunan Province of China;
湖南主产烟区烤烟感官质量特征及变化规律研究
3.
Occurrence of Cryptoexplosive Breccia and Porphyry Type Orebodies in Jiguanzui Deposit and Their Characteristics;
鸡冠嘴矿床隐爆角砾岩和斑岩型矿体的存在及其特征
参考词条
补充资料:特征值和特征向量
| 特征值和特征向量 characteristic value and characteristic vector 数学概念。若σ是线性空间V的线性变换,σ对V中某非零向量x的作用是伸缩 :σ(x)=aζ ,则称x是σ的属于a的特征向量 ,a称为σ的特征值。位似变换σk(即对V中所有a,有σk(a)=kα)使V中非零向量均为特征向量,它们同属特征值k;而旋转角θ(0<θ<π)的变换没有特征向量。可以通过矩阵表示求线性变换的特征值、特征向量。若A是n阶方阵,I是n阶单位矩阵,则称xI-A为A的特征方阵,xI-A的行列式 |xI-A|展开为x的n次多项式 fA(x)=xn-(a11+…+ann)xn-1+…+(-1)n|A|,称为A的特征多项式,它的根称为A的特征值。若λ0是A的一个特征值,则以λ0I-A为系数方阵的齐次方程组的非零解x称为A的属于λ的特征向量:Ax=λ0x。L.欧拉在化三元二次型到主轴的著作里隐含出现了特征方程概念,J.L.拉格朗日为处理六大行星运动的微分方程组首先明确给出特征方程概念。特征方程也称永年方程,特征值也称本征值、固有值。固有值问题在物理学许多部门是重要问题。线性变换或矩阵的对角化、二次型化到主轴都归为求特征值特征向量问题。每个实对称方阵的特征根均为实数。A.凯莱于19世纪中期通过对三阶方阵验证,宣告凯莱-哈密顿定理成立,即每个方阵A满足它的特征方程,fA(A)=An-(a11+…+ann)An-1+…+(-1)n|A|I=0。 |
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