此文仅为学习记录,内容会包括一些数学概念,定义,个人理解的摘要。希望能够分享一些学习内容。
第一节:Row Reduction and Echelon Forms
- Echelon form: 行消元后的矩阵
- Reduced echelon form: 行消元并且leading entry为1的矩阵。
- Echelon form and reduced echelon form are row equivalent to the original form.
- Span{v1, v2, v3,...... vp} is the collection of all vectors that can be written in the form c1*v1 + c2*v2 + ...... cp*vp with c1, .... cp scalars.
- Ax = 0 has a nontrival solution if and only if the equation has at least one free variable.(not full column rank)
- Ax = b 的解等于 Ax = 0 和 特解的和。
- 解线性方程组流程P54。
- 线性无关指任何向量不能组合成其中一个向量。
- Ax = b : ColA1 * x1 + ColA2 * x2 +.... ColAm * xm = b
- Matrix Transformations: T(x) = Ax is linear transformation.
- 转换矩阵是各维单位转换后的组合。A = [T(e1) T(e2) .. T(en)]
- A mapping T: R^n -> R^m is said to be onto R^m if each b in R^m is the image of at least one x in R^n. (Ax = b 有解)
- A mapping T: R^n -> R^m is said to be one-to-one R^m if each b in R^m is the image of at most one x in R^n.
第二节:Matrix Operation
- Each column of AB is a linear combination of the columns of A using weightings from the corresponding columns of B. AB = A[b1 b2 b3 b4 ,,, bp] = [Ab1 Ab2 ... Abp]
- Each row of AB is a linear combination of the columns of B using weightings from the corresponding rows of A.
- Warning: AB != BA. AB = AC !=> B = C. AB = 0 !=> A = 0 or B = 0
- 逆矩阵的定义:A-1*A = A*A-1 = E. 可以推导出A为方阵,详见Exercise 23-25 ,Section 2.1. A可逆的充要条件为A满秩(行列式不等于0)。
- 对[A I] 做行消元可以得到[I A-1]
- 矩阵满秩的所有等价定义:P129,P179.
- LU分解:A = LU,其中L为对角元素为1,的下半方阵,U为m*n的上半矩阵。L为变换矩阵的乘机的逆,U为A的Echelon form。计算L不需要计算各变换矩阵。详见P146。
- subspace, column space, null space的定义。
- A = m*n => rank(A) + rank(Nul(A)) = n.
- The dimension of a nonzero subspace H, denoted by dim H, is the numbers of vectors in any basis for H. The dimension of the zero subspace {0} us defined to be zero.
第三节:Introduction to Determinants
- determinant的定义和计算方式。
- 行消元不改变行列式值。交换行改变正负号。某一行乘以k,那么行列式乘以k。
- 三角矩阵的行列式为对角元素的乘积。
- det(AB) = det(A) * det(B)。
- Let A be an invertible n*n matrix. For any b in R^n, the unique solutionx of Ax = b has entries given by xi = det Ai(b)/det(A)。 Ai(b) 表示用b替换A的第i行。
- 由5可以推导出A^-1 = 1/det(A) * adj A. adj A = [(-1)^i+j* det(Aji)]
- 行列式与体积的关系:平行几何体的面积或者体积等于|det(A)|。而且 det(Ap) = det(A)*det(p)
第四节:Vector Spaces
- An indexed set {v1, v2, ... ... vp} of two or more vectors, with vi != 0, is linearly dependent, if and only if some vj (with j > 1) is a linear combination of the preceding vectors.
- Elementary row operation on a matrix do not affect the linear dependence relations among the columns of the matrix.
- Row operations can change the column space of a matrix.
- x = Pb [x]b: we call Pb the change-of-coordinates matrix from B to the standard basis in R^n.
- Let B and C be bases of a vector space V. Then there is a unique n*n matrix P_C<-B such that [x]c = P_C<-B [x]b. The columns of P_C<-B are the C-coordinate vectors of the vectors in the basis B, that is P_C<-B = [[b1]c [b2]c ... [bn]c]. [ C B ] ~ [ I P_C<-B]
第五节:Eigenvectors and Eigenvalues
- \(Ax =\lambda * x\)
- 不同特征值对应的特征向量线性无关。
- det(A - λ *I) = 0. 因为(A - λ *I)有非零解。
- A is similar to B if there is an invertible matrix P such that P^-1AP = B. They have same eigenvalues.
- 矩阵能够对角化的条件是有n个线性无关的特征向量(特征向量有无穷多个,线性无关向量的数量最多为n)。
- 特征空间的维度小于等于特征根的幂。当特征空间的维度等于特征根的幂,矩阵能够对角化。
- 相同坐标变换矩阵在不同维度空间坐标系下的转换:P328。相同坐标变换矩阵在不同坐标系的转换:P329。其实都是一样的。
- Suppose A = PDP^-1, where D is a diagonal n*n matrix. If B is the basis for R^n formed from the columns of P, then D is the B-matrix for the transformation x ->Ax. 当坐标系转换为P时,转换矩阵对应变成对角矩阵。
- 复数系统。
- 迭代求特征值和特征向量。 先估计一个特近的特征值和一个向量\(x_0\)(其中的最大元素为1)。然后迭代,迭代流程详见P365。迭代可以得到最大特征值的原因如下:因为\((\lambda_1)^{-k}A^kx\rightarrow c_1v_1\),所以对于任意\(x\),当k趋近无穷的时候,\(A^kx\)会和特征向量同向。虽然\(\lambda\)和\(c_1v_1\)都未知,但是由于\(Ax_k\)会趋近\(\lambda*x_k\),我们只要令\(x_k\)的最大元素为1,就能得到\(\lambda\)。
第六节 :Inner Product, Length, and Orthogonality
- \((Row A)^{\bot} = Nul A\) and \((Col A)^{\bot} = Nul A^{\top}\). 这很显然,其中\(A^{\bot}\)表示与A空间垂直的空间。
- An orthogonal basis for a subspace W of \(R^n\) is a basis for W that is also an orthogonal set.
- 一个向量在某一维的投影:\(\hat{y} = proj_L y = \frac{y\cdot u}{u\cdot u}u\).
- An set is an orthonormal set if it is an orthogonal set of unit vectors.
- An m*n matrix U has orthonormal columns if and only if \(U^\top U = I\)
- 一个向量在某一空间的投影:\(\hat{y} = proj_w y = \frac{y\cdot u_1}{u_1\cdot u_1}u_1 + \frac{y\cdot u_2}{u_1\cdot u_2}u_2 + ... + \frac{y{\cdot}u_p}{u_p\cdot u_p}u_p.\)
- 如何将一堆向量弄成正交单位向量: repeat 3.
- QR分解:如果A有线性无关的列向量,那么可以分解成Q(正交向量)和R(上三角矩阵,就是原坐标在正交坐标系的系数)\(Q^{\top}A=Q^{\top}(QR) = IR = R\)
- 最小平方lse(机器学习基础:非贝叶斯条件下的线性拟合问题),由\(A^{\top}(b-A\hat{x})=0\)得到\(\hat{x}=(A^\top A)^{-1}A^{\top}b\)。如果A可逆,此式可以化简。如果可以做QR分解,那么\(\hat{x}=R^{-1}Q^{\top}b\).
- 函数内积的概念。
第七节:Diagonaliztion of Symmetric matrixs
- 如果一个矩阵是对称的,那么它的任何两个特征值所对应的特征空间是正交的。
- 矩阵可正交对角化等价于它是一个对称矩阵。
- \(A=PDP^{-1}\)可以得到PCA(机器学习算法主成分分析,对协方差矩阵(对称)做对角化)
- 将二次方程转化成没有叉乘项的形式。x=Py, \(A = PDP^{-1}\).
- 对于二次函数\(x^{\top}Ax\),在|x| = 1的条件下,最大值为最大特征值,最小值为最小特征值。如果最大特征值(\(x^{\top}u_1\))不能选,则选择次之。
- 正交矩阵P大概意思就是在该坐标系下,函数比较对称,D为坐标轴的伸展比例。
- SVD分解(该书的最后一个内容,蕴含了很多上述的内容)是要将矩阵分解成类似PDP^-1的形式,但是不是任何矩阵都能表示成这种形式(有n个线性无关的特征向量,正交的话还要是对称矩阵)。其中\(A=U{\Sigma}V^{\top}\),\({\Sigma}\)是A的singular value(\(A^{\top}A\)的特征值的开方),V是\(A^{\top}A\)的对应特征向量,U是\(AV\)的归一化。AV内的向量是垂直的。\(U{\Sigma}\)是AV的另外一种表示。
来源:https://www.cnblogs.com/wead-hsu/p/3870330.html