AI 助理
备案控制台
开发者社区 云计算 文章 正文

[Bhatia.Matrix Analysis.Solutions to Exercises and Problems]ExI.5.8

2014-11-22 594
版权
版权声明:
本文内容由阿里云实名注册用户自发贡献,版权归原作者所有,阿里云开发者社区不拥有其著作权,亦不承担相应法律责任。具体规则请查看《 阿里云开发者社区用户服务协议》和 《阿里云开发者社区知识产权保护指引》。如果您发现本社区中有涉嫌抄袭的内容,填写 侵权投诉表单进行举报,一经查实,本社区将立刻删除涉嫌侵权内容。
简介: Prove that for any matrices $A,B$ we have $$\bex |\per (AB)|^2\leq \per (AA^*)\cdot \per (B^*B). \eex$$ (The corresponding relation for determinants is an easy equality.

Prove that for any matrices $A,B$ we have $$\bex |\per (AB)|^2\leq \per (AA^*)\cdot \per (B^*B). \eex$$ (The corresponding relation for determinants is an easy equality.)

 

Solution. Let $$\bex A=\sex{\ba{cc} \al_1\\ \vdots\\ \al_n \ea},\quad B=\sex{\beta_1,\cdots,\beta_n}. \eex$$ Then $$\bex AB=\sex{\sef{\al_i,\beta_j}}. \eex$$ By Exercise I.5.7, $$\beex \bea |\per (AB)|^2 &=\sev{\per (\sef{\al_i,\beta_j})}^2\\ &\leq \per (\sef{\al_i,\al_j})\cdot \per (\sef{\beta_i,\beta_j})\\ &=\per(AA^*)\cdot \per(B^*B). \eea \eeex$$

张祖锦
目录
相关文章
张祖锦
|
资源调度
[Bhatia.Matrix Analysis.Solutions to Exercises and Problems]ExI.5.1
Show that the inner product $$\bex \sef{x_1\wedge \cdots \wedge x_k,y_1\wedge \cdots\wedge y_k} \eex$$ is equal to the determinant of the $k\times k$ matrix $\sex{\sef{x_i,y_j}}$.
张祖锦
627 0
张祖锦
|
应用服务中间件 AHAS Perl
[Bhatia.Matrix Analysis.Solutions to Exercises and Problems]ExI.5.6
Let $A$ be a nilpotent operator. Show how to obtain, from aJordan basis for $A$, aJordan basis of $\wedge^2A$.
张祖锦
805 0
张祖锦
[Bhatia.Matrix Analysis.Solutions to Exercises and Problems]ExI.5.7
Prove that for any vectors $$\bex u_1,\cdots,u_k,\quad v_1,\cdots,v_k, \eex$$ we have $$\bex |\det(\sef{u_i,v_j})|^2 \leq \det\sex{\sef{u_i,u_j}}\cdot...
张祖锦
607 0
张祖锦
[Bhatia.Matrix Analysis.Solutions to Exercises and Problems]ExI.5.3
Let $\scrM$ be a $p$-dimensional subspace of $\scrH$ and $\scrN$ its orthogonal complement. Choosing $j$ vectors from $\scrM$ and $k-j$ vectors from $...
张祖锦
723 0
张祖锦
[Bhatia.Matrix Analysis.Solutions to Exercises and Problems]ExI.5.2
The elementary tensors $x\otimes \cdots \otimes x$, with all factors equal, are all in the subspace $\vee^k\scrH$.
张祖锦
453 0
张祖锦
|
关系型数据库
[Bhatia.Matrix Analysis.Solutions to Exercises and Problems]ExI.2.4
(1). The singular value decomposition leads tot eh polar decomposition: Every operator $A$ can be written as $A=UP$, where $U$ is unitary and $P$ is positive.
张祖锦
849 0
张祖锦
|
Perl
[Bhatia.Matrix Analysis.Solutions to Exercises and Problems]ExI.2.9
(1). When $A$ is normal, the set $W(A)$ is the convex hull of the eigenvalues of $A$. For nonnormal matrices, $W(A)$ may be bigger than the convex hull of its eigenvalues.
张祖锦
546 0
张祖锦
[Bhatia.Matrix Analysis.Solutions to Exercises and Problems]ExI.3.7
For every matrix $A$, the matrix $$\bex \sex{\ba{cc} I&A\\ 0&I \ea} \eex$$ is invertible and its inverse is $$\bex \sex{\ba{cc} I&-A\\ 0&I \ea}.
张祖锦
821 0
张祖锦
|
Go
[Bhatia.Matrix Analysis.Solutions to Exercises and Problems]ExI.4.1
Let $x,y,z$ be linearly independent vectors in $\scrH$. Find a necessary and sufficient condition that a vector $w$ mush satisfy in order that the bil...
张祖锦
665 0
张祖锦
|
Perl
[Bhatia.Matrix Analysis.Solutions to Exercises and Problems]ExI.2.5
Show that matrices with distinct eigenvalues are dense in the space of all $n\times n$ matrices. (Use the Schur triangularisation)   Solution.
张祖锦
697 0