课程： 6.3 域、共同域和范围

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域、共域和范围
Given a linear transformation of the form
::给定窗体的直线变换

$\begin{aligned} T (\vec{x}) = A \vec{x} \end{aligned}$ where $\begin{aligned} A \end{aligned}$ is a standard matrix
::T(x)=Ax,其中A为标准矩阵

The domain of the transformation is the set of all inputs of the variable $\begin{aligned} \vec{x} \end{aligned}$ . So, for example, if $\begin{aligned} T \end{aligned}$ is a linear transformation
::变换的域是变量 x 的所有输入的集合。例如,如果 T 是线性变换

$\begin{aligned} T : R^{n} \to R^{m} \end{aligned}$
::T:RnRm

The set $\begin{aligned} R^{n} \end{aligned}$ is the input space, or the domain of the linear transformation $\begin{aligned} T \end{aligned}$ . So, let's look at an example of a linear transformation and try to find the domain.
::设置 Rn 是输入空间, 或者线性变换 T 的域。所以, 让我们看看线性变换的示例, 并试着找到域。

$\begin{aligned} T : R^{3} \to R^{3} \\ T ([\begin{matrix} x_{1} \\ x_{2} \\ x_{3} \end{matrix}]) = [\begin{matrix} 3 & - 1 & 2 \\ 0 & - 2 & 1 \\ - 1 & 2 & 0 \end{matrix}] [\begin{matrix} x_{1} \\ x_{2} \\ x_{3} \end{matrix}] \end{aligned}$
::T:R3QR3T([x1x2x3]) =[3-120-21-120][x1x2x3]

And looking at this transformation we see that the input space has every vector in $\begin{aligned} R^{3} \end{aligned}$ .
::我们看到输入空间含有R3中的每一个矢量

Now, the codomain of a linear transformation is the space in which the linear transformation maps to.
::现在,线性变换的共域就是线性变换映射到的空间。

So, for example, taking
::例如,举例说,以

$\begin{aligned} T : R^{2} \to R^{3} \\ T ([\begin{matrix} x_{1} \\ x_{2} \end{matrix}]) = [\begin{matrix} 1 & - 1 \\ 2 & 0 \\ 3 & - 2 \end{matrix}] \cdot [\begin{matrix} x_{1} \\ x_{2} \end{matrix}] \end{aligned}$
::T:R2R3T([x1x2]) =[1-1203-2] [x1x2]

Here, we see that the domain of this linear transformation is $\begin{aligned} R^{2} \end{aligned}$ and the codomain of this matrix is $\begin{aligned} R^{3} \end{aligned}$ because that is the output space of this linear transformation as the resulting vector will be a vector in $\begin{aligned} R^{3} \end{aligned}$ .
::在这里,我们可以看到,这种线性变换的域是R2,而这个矩阵的共域是R3,因为这就是这种线性变换的输出空间,因为由此产生的矢量将是R3中的矢量。

Now, the codomain of a linear transformation is different than the range of a linear transformation.
::现在,线性变换的共域与线性变换的范围不同。

The range of a linear transformation is the set of all of the images of a linear transformation.
::线性变换的范围是线性变换的所有图像的集合。

So, staying with the last example we looked at, we have that the codomain is the reals in 3 dimensions. However, the set of all of the images is
::所以,与我们所看到的最后一个例子一样, 我们发现, 共域是3维的真数。然而, 所有图像的集是

$\begin{aligned} range (T) = {[\begin{matrix} x_{1} - x_{2} \\ 2 x_{1} \\ 3 x_{1} - 2 x_{2} \end{matrix}] | [\begin{matrix} x_{1} \\ x_{2} \end{matrix}] \in R^{2}} \end{aligned}$
::区域( T) [x1 - x22x13x1 - 2x2] [x1x2] R2}

which is a subset of the codomain, however, it is not equal to that.
::这是共域的子集, 但是,它不等于它。

Next, let's look at a couple examples and the diagrams of those examples:
::下面,让我们看看几个例子和这些例子的图表:

Let $\begin{aligned} T : R^{3} \to R^{3} \\ T (\vec{x}) = A \vec{x} \\ A = [\begin{matrix} 1 & 0 & - 1 \\ 2 & 3 & 0 \\ - 1 & 5 & 2 \end{matrix}] \\ A \vec{x} = [\begin{matrix} 1 & 0 & - 1 \\ 2 & 3 & 0 \\ - 1 & 5 & 2 \end{matrix}] \cdot [\begin{matrix} x_{1} \\ x_{2} \\ x_{3} \end{matrix}] \end{aligned}$
::让 T: R3QR3T( x%) =AxIA = [10- 1230-152] Ax{[10- 1230-152] {[10- 1230-152] {[x1x2x3]

The domain of this transformation is all of $\begin{aligned} R^{3} \end{aligned}$ and the entire output space of this linear transformation is $\begin{aligned} R^{3} \end{aligned}$ , so the codomain is the same set as the domain which is $\begin{aligned} R^{3} \end{aligned}$ .
::这种变换的域为R3, 线性变换的整个输出空间为R3, 因此共域与R3的域相同。

Now, searching for the set of all images, or in other words, the range, we get that it is equal to
::现在,搜索全部图像集, 换言之, 范围, 我们得到它等于

$\begin{aligned} Range (T (\vec{x})) = {[\begin{matrix} x_{1} - x_{3} \\ 2 x_{1} + 3 x_{2} \\ - 1 x_{1} + 5 x_{2} + 2 x_{3} \end{matrix}] | x_{1}, x_{2}, x_{3} \in R \to [\begin{matrix} x_{1} \\ x_{2} \\ x_{3} \end{matrix}] \in R^{3}} \end{aligned}$
::区域( T( x) ) [x1 - x32x1+3x2 - 1x1+5x2+2x3] x1,x2,x3}[x1x2x3] [x1x2x3] {R3}

Due to technical constraints it will be harder to visualize this linear transformation, but let's try another example and try and apply our principles of domain, codomain and range.
::由于技术限制,很难想象这种线性转变, 但是让我们再试一个例子, 尝试运用我们的域、共域和范围原则。

Now, let
::现在,让我们

$\begin{aligned} T : R^{2} \to R^{2} \\ T (\vec{x}) = A \vec{x} \\ A = [\begin{matrix} 5 & 2 \\ - 2 & 3 \end{matrix}] \\ A \vec{x} = [\begin{matrix} 5 & 2 \\ - 2 & 3 \end{matrix}] \cdot [\begin{matrix} x_{1} \\ x_{2} \end{matrix}] \end{aligned}$
::T:R2-R2T(x__)=Ax_A=[52-23]Ax[52-23]和[x1x2]

From this, we see that the input and output space, domain and codomain, are both $\begin{aligned} R^{2} \end{aligned}$ .
::我们从中看到,输入和输出空间, 域和共同域, 既是R2,又是R2。

Looking at this to find the range, we get that the range, or the set of all images of the transformations is
::或所有变换图像的集

$\begin{aligned} {[\begin{matrix} 5 x_{1} + 2 x_{2} \\ - 2 x_{1} + 3 x_{2} \end{matrix}], x_{1}, x_{2} \in R} \end{aligned}$
::{5x1+2x2-2x1+3x2,x1,x2R}

Looking at this visually, we see that this linear transformation transforms the space
::我们看到这种直线转换改变了空间

to end up getting
::最终得到

章节大纲

常规

域、 共域和范围

域、共域和范围