線代啟示錄

每週問題 June 26, 2017

Posted on 06/26/2017 by ccjou

對於秩-1方陣 $A$ ，證明 $\det (A+I)=\hbox{trace}A+1$ 。

Let $A$ be an $n\times n$ matrix and $\hbox{rank}A=1$ . Prove that $\det (A+I)=\hbox{trace}A+1$ .

每週問題 June 19, 2017

Posted on 06/19/2017 by ccjou

證明一個可逆矩陣存在 QR 分解。

Prove that an invertible matrix $A$ can be represented in the form $A=QR$ , where $Q$ is an orthogonal matrix and $R$ is an upper triangular matrix.

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Posted in pow 內積空間, 每週問題 | Tagged Gram-Schmidt 正交化, QR 分解 | Leave a comment

每週問題 June 12, 2017

Posted on 06/12/2017 by ccjou

證明 Gram-Schmidt 正交化定理。

Let $\mathbf{v}_1,\ldots,\mathbf{v}_n$ be a basis of an inner product space. Prove that there exists an orthogonal basis $\mathbf{e}_1,\ldots,\mathbf{e}_n$ such that $\mathbf{e}_i\in\hbox{span}\{\mathbf{v}_1,\ldots,\mathbf{v}_i\}$ for all $i=1,\ldots,n$ .

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Posted in pow 內積空間, 每週問題 | Tagged Gram-Schmidt 正交化 | 1 Comment

每週問題 June 5, 2017

Posted on 06/05/2017 by ccjou

證明 $A+A^T$ 是不可逆矩陣的一個充分條件。

Let $A$ and $B$ be $n\times n$ matrices, where $n$ is an odd number. Prove that if $AB=0$ then at least one of the matrices $A+A^T$ and $B+B^T$ is singular.

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Posted in pow 向量空間, 每週問題 | Tagged 秩, Sylvester 不等式 | Leave a comment

每週問題 May 29, 2017

Posted on 05/29/2017 by ccjou

這是零空間的包容關係與矩陣乘法的問題。

Let $A$ and $B$ be complex matrices of size $m\times n$ and $p\times n$ , respectively. If $N(A)\subset N(B)$ , prove that $B=XA$ for some $p\times m$ matrix $X$ .

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Posted in pow 內積空間, 每週問題 | Tagged 零空間 | Leave a comment

每週問題 May 22, 2017

Posted on 05/22/2017 by ccjou

以伴隨矩陣的行列式表達分塊矩陣的行列式。

Suppose $A$ is $n\times n$ , $B$ is $n\times 1$ , $C$ is $1\times n$ , and $d$ is a number. Prove that

$\begin{vmatrix} A&B\\ C&d \end{vmatrix}=d|A|-C(\hbox{adj}A)B$ .

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Posted in pow 行列式, 每週問題 | Tagged 分塊矩陣, 伴隨矩陣 | 1 Comment

每週問題 May 15, 2017

Posted on 05/15/2017 by ccjou

反對稱矩陣的伴隨矩陣 (adjugate) 是對稱或反對稱矩陣。

Let $A$ be an $n\times n$ skew-symmetric matrix. Prove that $\hbox{adj}A$ is a symmetric matrix for odd $n$ and a skew-symmetric matrix for even $n$ .

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Posted in pow 行列式, 每週問題 | Tagged 反對稱矩陣, 對稱矩陣, 伴隨矩陣 | Leave a comment

每週問題 May 8, 2017

Posted on 05/08/2017 by ccjou

這是關於基底的一個充分條件問題。

Let $\mathbf{v}_1,\ldots,\mathbf{v}_{n+1}$ be vectors in $\mathbb{R}^n$ ( $n\ge 2$ ) such that $\mathbf{v}_i^T\mathbf{v}_j<0$ for $i\neq j$ . Prove that any $n$ of these vectors form a basis of $\mathbb{R}^n$ .

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Posted in pow 向量空間, 每週問題 | Tagged 基底 | 3 Comments

每週問題 May 1, 2017

Posted on 05/01/2017 by ccjou

證明嚴格對角佔優 (strictly diagonally dominant) 矩陣是可逆矩陣。

Let $A=[a_{ij}]$ be an $n\times n$ matrix. Prove that if $|a_{ii}|>\sum_{j\neq i}|a_{ij}|$ for $i=1,\ldots,n$ , then $A$ is invertible.

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Posted in pow 線性方程與矩陣代數, 每週問題 | Tagged 可逆矩陣, 對角佔優矩陣, 三角不等式 | Leave a comment

每週問題 April 24, 2017

Posted on 04/24/2017 by ccjou

證明矩陣積的值域與零空間的維數恆等式。

Let $A$ be an $m\times n$ matrix and $B$ be an $n\times p$ matrix. Prove that

$\dim (C(B)\cap N(A))=\dim C(B)-\dim C(AB)=\dim N(AB)-\dim N(B)$ .

Note that $C(X)$ and $N(X)$ denote the column space and nullspace of $X$ , respectively.

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Posted in pow 向量空間, 每週問題 | Tagged 秩─零度定理, 子空間交集 | Leave a comment

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線代啟示錄

每週問題 June 26, 2017

每週問題 June 19, 2017

每週問題 June 12, 2017

每週問題 June 5, 2017

每週問題 May 29, 2017

每週問題 May 22, 2017

每週問題 May 15, 2017

每週問題 May 8, 2017

每週問題 May 1, 2017

每週問題 April 24, 2017

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