c6-解线性方程组的迭代法

第六章解线性方程组的迭代法

6.1 迭代法的基本概念6.1.1 迭代法的介绍6.1.2 序列的极限6.1.3 迭代法的收敛性6.2 J 迭代法与 GS 迭代法6.2.1 雅可比迭代法6.2.2 高斯-塞德尔迭代法6.2.3 雅可比迭代与高斯-塞德尔迭代收敛性6.3 超松弛迭代法6.3.1 逐次超松弛迭代法 SOR6.3.2 SOR 迭代法的收敛性

6.1 迭代法的基本概念

6.1.1 迭代法的介绍

迭代法的思路
- $\bm A \bm x = \bm b$ $\bm x = \bm B \bm x + \bm f$ .
  - $\bm B = \bm I - \bm A$ $\bm f = \bm b$ .
  - $\bm A = \bm M - \bm N$ $\bm M \bm x = \bm N \bm x + \bm b$ .
  - $\bm M$ $\bm B$ 称为迭代矩阵.
- $\bm x^* = \bm B \bm x^* + \bm f$ .
- $\bm x^{(k+1)} = \bm B \bm x^{(k)} + \bm f$ .
迭代法的性能
- $\bm x^* = \clim k \bm x^{k}$ 存在.
- $\bm \ve^{(k+1)} = \bm x^{(k+1)} - \bm x^* = \bm B \bm \ve^{(k)}$ .
- $\clim k \bm B^k = \bm 0$ .

6.1.2 序列的极限

极限的定义
- $\clim k \bm x^{(k)} = \bm x \RLA \clim k \Norm{\bm x^{(k)} - \bm x} = 0$ .
- $\clim k \bm A_k = \bm A \RLA \clim k \Norm{\bm A_k - \bm A} = 0$ .
极限的定理
- $\clim k \bm A_k = \bm 0 \RLA \forall \bm x \in \R^n \colon \clim k \bm A_k \bm x = \bm 0$ .
- $\clim k \bm B^k = \bm 0 \RLA \rho(\bm B) < 1 \RLA \exist \Norm{\cdot}_c \colon \Norm{\bm B}_c < 1$ .
- $\clim k \Norm{\bm B^k}^\tfrac{1}{k} = \rho(\bm B)$ .

证明

1. $\clim k \bm A_k = \bm 0 \RLA \forall \bm x \in \R^n \colon \clim k \bm A_k \bm x = \bm 0$ .

1.1 充分性

$\clim k \bm A_k = \bm 0$ $\clim k \Norm{\bm A_k} = 0$ $\forall \bm x \in \R^n$ ，

$\clim k \Norm{\bm A_k \bm x} \le \clim k \Norm{\bm A_k} \Norm{\bm x} = 0$ $\clim k \bm A_k \bm x = \bm 0$ .

1.2 必要性

$\bm x = \bm e_i$ $\clim k \bm A_k$ $i$ 个分量为零. 证毕.

2. $\clim k \bm B^k = \bm 0 \RLA \rho(\bm B) < 1 \RLA \exist \Norm{\cdot}_c \colon \Norm{\bm B}_c < 1$ .

2.1 $\clim k \bm B^k = \bm 0 \RA \rho(\bm B) < 1$ .

$\lambda \ge 1$ $\exist \bm x \ne \bm 0 \colon \bm B \bm x = \lambda \bm x$ $\Norm{\bm B^k \bm x} = \vqty{\lambda}^k \Norm{\bm x} \ne 0$ ，矛盾.

2.2 $\rho(\bm B) < 1 \RA \exist \Norm{\cdot}_c \colon \Norm{\bm B}_c < 1$ .

由第 5 章定理 18 即得.

2.3 $\exist \Norm{\cdot}_c \colon \Norm{\bm B}_c < 1 \RA \clim k \bm B^k = \bm 0$ .

$\clim k \Norm{\bm B^k}_c \le \clim k \Norm{\bm B}_c^k = \bm 0$ .

证毕.

6.1.3 迭代法的收敛性

定理 5 $\RLA \rho(\bm B) < 1$ .

证明

$\rho(\bm B) < 1 \RA$ 迭代法收敛.

由

{\begin{cases} x^{*} = B x^{*} + f, \\ x^{(k)} = B x^{(k - 1)} + f, \end{cases}

得

\begin{aligned} ε^{(k)} & = x^{(k)} - x^{*} = B (x^{(k - 1)} - x^{*}) \\ = B ε^{(k - 1)} = B^{k} (x^{(0)} - x^{*}) . \end{aligned}

$\rho(\bm B) < 1$ ，知

lim_{k \to \infty} x^{(k)} = x^{*} + lim_{k \to \infty} ε^{(k)} = x^{*} + lim_{k \to \infty} B^{k} (x^{(0)} - x^{*}) = x^{*} .

$\RA \rho(\bm B) < 1$ .

$\forall \bm x^{(0)} \colon \clim k \bm x^{(k)} = \bm x^*$ ，

$\clim k \bm \ve^{(k)} = \clim k \bm B^{k} \bm \ve^{(0)} = \bm 0$ ，

$\clim k \bm B^k = \bm 0$ $\rho(\bm B) < 1$ . 证毕.

定理 6（误差估计） $\Norm{\bm B} = q < 1$ ，则

$\forall \bm x^{(0)} \colon \pqty{\clim k \bm x^{(k)} = \bm x^*} \and \pqty{\bm x^{*} = \bm B \bm x^* + \bm f}$ .
$\Norm{\bm x^* - \bm x^{(k)}} \le q^k \Norm{\bm x^* - \bm x^{(0)}}$ .
$\Norm{\bm x^* - \bm x^{(k)}} \le \dfrac{q}{1 - q} \Norm{\bm x^{(k)} - \bm x^{(k-1)}}$ .
$\Norm{\bm x^* - \bm x^{(k)}} \le \dfrac{q^k}{1 - q} \Norm{\bm x^{(1)} - \bm x^{(0)}}$ .

证明

$\rho(\bm B) \le \Norm{\bm B} < 1$ ，由定理 5 得证.
$\Norm{\bm x^* - \bm x^{(k)}} = \Norm{\bm B^k (\bm x^* - \bm x^{(0)})} \le q^k \Norm{\bm x^* - \bm x^{(0)}}$ .
$\Norm{\bm x^{(k+1)} - \bm x^{(k)}} \ge \Norm{\bm x^* - \bm x^{(k)}} - \Norm{\bm x^* - \bm x^{(k+1)}} \ge (1 - q) \Norm{\bm x^* - \bm x^{(k)}}$ .
$\Norm{\bm x^* - \bm x^{(k)}} \le \dfrac{1}{1 - q} \Norm{\bm x^{(k + 1)} - \bm x^{(k)}} \le \dfrac{q}{1 - q} \Norm{\bm x^{(k)} - \bm x^{(k-1)}}$ .
$\bm x^{(k+1)} - \bm x^{(k)} = \bm B (\bm x^{(k)} - \bm x^{(k-1)})$ 和第三点即得.

命题（收敛速度）

$\Norm{\bm B^k} = \sup \Bqty{ \left. \left. {\Norm{\bm \ve^{(k)}}} \right/ {\Norm{\bm \ve^{(0)}}} \ \right |\ \bm \ve^{(0)} \ne \bm 0 }$ .
$\forall \bm \ve^{(0)} \colon \dfrac{\Norm{\bm \ve^{(k)}}}{\Norm{\bm \ve^{(0)}}} \le \sigma = 10^{-s} \RLA k \ge \dfrac{s \ln 10}{-\ln \Norm{\bm B^k}^\tfrac{1}{k}}$ .

证明

上确界
1. $\bm \ve^{(k)} = \bm B^k \bm \ve^{(0)}$ $\dfrac{\Norm{\bm \ve^{(k)}}}{\Norm{\bm \ve^{(0)}}} \le \Norm{\bm B^k}$ ，
2. $\d \Norm{\bm B^k} = \max_{\bm \ve^{(0)} \ne \bm 0} \dfrac{\Norm{\bm B^k \bm \ve^{(0)}}}{\bm \ve^{(0)}} = \max_{\bm \ve^{(0)} \ne \bm 0} \dfrac{\Norm{\bm \ve^{(k)}}}{\bm \ve^{(0)}}$ .
$\Norm{\bm B^k} \le \sigma = 10^{-s}$ 即得.

定义（收敛速度） 对于一阶定常迭代法，

平均收敛速度 $R_k(\bm B) := -\ln\Norm{\bm B^k}^\tfrac{1}{k}$ .
渐进收敛速度 $R(\bm B) := -\ln\rho(\bm B)$ .

备注

$R(\bm B) = \clim k R_k(\bm B)$ ，与迭代次数和范数类型无关.
$k \ge \dfrac{s \ln 10}{R(\bm B)}$ .

6.2 J 迭代法与 GS 迭代法

6.2.1 雅可比迭代法

$\bm A$ 的分解
1. $\bm A = \bm D - \bm L - \bm U$ .
2. $\bm M := \bm D, \bm N := \bm L + \bm U$ .
$\bm A \bm x = \bm b$ 的转换
1. $\bm D \bm x^{(k+1)} = (\bm L + \bm U) \bm x^{(k)} + \bm b$ .
2. $\bm x^{(k+1)} = \bm D\inv (\bm L + \bm U) \bm x^{(k)} + \bm D\inv \bm b, k \in \N$ .
3. $\bm J := \bm D\inv (\bm L + \bm U)$ .

6.2.2 高斯-塞德尔迭代法

$\bm A$ 的分解
1. $\bm A = \bm D - \bm L - \bm U$ .
2. $\bm M = \bm D - \bm L, \bm N = \bm U$ .
$\bm A \bm x = \bm b$ 的转换
1. $(\bm D - \bm L) \bm x^{(k+1)} = \bm U \bm x^{(k)} + \bm b, k \in \N$ .
2. $\bm D \bm x^{(k+1)} = \bm L \bm x^{(k+1)} + \bm U \bm x^{(k)} + \bm b, k \in \N$ .
3. $\bm G := (\bm D - \bm L)\inv \bm U$ .

6.2.3 雅可比迭代与高斯-塞德尔迭代收敛性

$\bm A \bm x = \bm b$ $\bm D$ 非奇异，则
- $\RLA \rho(\bm J) < 1 \LA \Norm{\bm J} < 1$ .
- $\RLA \rho(\bm G) < 1 \LA \Norm{\bm G} < 1$ .
对角占优矩阵
- $\vqty{a_{ii}} > \dsum_{j=1, j\ne i}^n \vqty{a_{ij}}, i = \oneton$ .
- $\vqty{a_{ii}} \ge \dsum_{j=1, j\ne i}^n \vqty{a_{ij}}, i = \oneton$ ，且至少一个不等式严格成立.
可约矩阵
- $\bm P$ $\bm P\trans \bm A \bm P = \begin{pmatrix} \bm A_{11} & \bm A_{12} \\ \bm 0 & \bm A_{22} \end{pmatrix}$ $\bm A_{11}$ $\bm A_{22}$ 均为方阵.
  - 三对角方阵是不可约阵.
  - 若所有元素非零，则为不可约阵.
- $\bm P\trans \bm A \bm P (\bm P\trans \bm x) = \bm P\trans \bm b$ ，于是可化为低阶方程组求解.
  - $\bm P\trans \bm x = \pqty{\bm y_1, \bm y_2}\trans, \bm P\trans \bm b = (\bm d_1, \bm d_2)\trans$ $\bm y_1, \bm d_1$ $\bm A_{11}$ 维度相同.
  - $\bm A \bm x = \bm b \RLA \begin{cases} \bm A_{11} \bm y_1 + \bm A_{12} \bm y_2 = \bm d_1, \\ \hspace{3.95em} \bm A_{22} \bm y_2 = \bm d_2. \end{cases}$ $\bm y_2 \ra \bm y_1 \ra \bm x$ .

定理 8（对角占优定理） 严格对角占优矩阵、不可约弱对角占优矩阵，是非奇异矩阵.

证明

1. 严格对角占优矩阵是非奇异矩阵.

$\det(\bm A) = 0$ $\bm A \bm x = \bm 0$ $\bm x = (\soneto{x}{n})\trans$ ，

$\vqty{x_k} = \d\max_{1 \le i \le n} \vqty{x_i}$ $k$ $\dsum_{j=1}^n a_{kj} x_j = 0$ 有，

| a_{k k} x_{k} | = | \sum_{j = 1, j \neq k}^{n} a_{k j} x_{j} | \leq \sum_{j = 1, j \neq k}^{n} | a_{k j} | | x_{j} | \leq | x_{k} | \sum_{j = 1, j \neq k}^{n} | a_{k j} |,

$\vqty{a_{kk}} \le \dsum_{j=1, j \ne k}^n \vqty{a_{kj}}$ ，矛盾.

2. 不可约弱对角占优矩阵是非奇异矩阵.

$\det(\bm A) = 0$ $\bm A \bm x = \bm 0$ $\bm x = (\soneto{x}{n})\trans$ ，

2.1 对于弱对角占优矩阵，如下定义集合，并证明集合非空.

J := {k ∣ (\forall i : | x_{k} | \geq | x_{i} |) \land (\exists j : | x_{k} | > | x_{j} |)},

$J$ $\vqty{x_1} = \vqty{x_2} = \cdots = \vqty{x_n}$ ，

$\forall i$ $\dsum_{j=1}^n a_{ij} x_j = 0$ 有

| a_{i i} x_{i} | = | \sum_{j \neq i} a_{i j} x_{j} | \leq \sum_{j \neq i} | a_{i j} | | x_{j} | = | x_{j} | \sum_{j \neq i} | a_{i j} |,

$\forall i \colon \vqty{a_{ii}} \le \dsum_{j \ne i} \vqty{a_{ij}}$ ，与弱对角占优矩阵矛盾.

2.2 对于不可约矩阵，进一步证明非奇异性.

{\begin{cases} | a_{k k} | | x_{k} | \leq \sum_{j \neq k} | a_{k j} | | x_{j} |, \\ | a_{k k} | \geq \sum_{j \neq k} | a_{k j} |, \end{cases} \Rightarrow \sum_{j \neq k} | a_{k j} | \leq \sum_{j \neq k} | a_{k j} | \frac{| x_{j} |}{| x_{k} |},

$\forall j \pqty{\vqty{x_j} < \vqty{x_k}} \colon a_{kj} = 0$ $\forall k \in J, \forall j \notin J \colon a_{kj} = 0$ ，

从而可排列为分块上三角矩阵，矛盾. 证毕.

备注 $\left| \begin{array}{ccc} 1 & 0 & -1 \\ 1 & 2 & 0 \\ -3 & 0 & 3 \\ \end{array} \right| = 0$ .

定理 9 $\bm A \bm x = \bm b$ 的 J 迭代法与 GS 迭代法均收敛.

$\bm A$ 为严格对角占优矩阵.
$\bm A$ 为不可约弱对角占优矩阵.

证明

严格对角占优矩阵 → GS 迭代法收敛.

$\bm G = (\bm D - \bm L) \inv \bm U$ 的特征值，即下述方程的解

\begin{aligned} 0 & = \det (λ I - G) \\ = \det (λ I - (D - L)^{- 1} U) \\ = \det ((D - L)^{- 1}) \det (λ (D - L) - U), \end{aligned}

$\det((\bm D - \bm L)\inv) \ne 0$ $\det(\lambda(\bm D - \bm L) - \bm U) = 0$ 的根. 记

\begin{matrix} C := λ (D - L) - U = | \begin{matrix} λ a_{11} & a_{12} & \dots & a_{1 n} \\ λ a_{21} & λ a_{22} & \dots & a_{2 n} \\ ⋮ & ⋮ & ⋮ \\ λ a_{n 1} & λ a_{n 2} & \dots & λ a_{n n} \end{matrix} |, \end{matrix}

$\vqty{\lambda} \ge 1$ 时，

\begin{aligned} | c_{i i} | & = | λ a_{i i} | > | λ | \sum_{j \neq i} | a_{i j} | \\ \geq \sum_{j = 1}^{i - 1} | λ a_{i j} | + \sum_{j = i + 1}^{n} | a_{i j} | = \sum_{j \neq i} | c_{i j} |, \end{aligned}

$\bm C$ $\det(\bm C) \ne 0$ $\forall \lambda \colon \vqty{\lambda} < 1$ .

其余条件同理可证. 证毕.

定理 10 $\bm A$ 对称 $\forall i \colon a_{ii} > 0$ ，则

$\RLA$ $\bm A$ $2 \bm D -\bm A$ 均为正定矩阵.
$\LA \bm A$ 正定.

证明略.

特殊的，对于二阶矩阵有
$\begin{matrix} B_{J} = (\begin{matrix} 0 & - \frac{a_{12}}{a_{11}} \\ - \frac{a_{21}}{a_{22}} & 0 \end{matrix}), ρ (B_{J}) = \sqrt{| \frac{a_{12} a_{21}}{a_{11} a_{22}} |}, \end{matrix}$ $\begin{matrix} B_{S} = (\begin{matrix} 0 & - \frac{a_{12}}{a_{11}} \\ 0 & \frac{a_{12} a_{21}}{a_{11} a_{22}} \end{matrix}), ρ (B_{S}) = | \frac{a_{12} a_{21}}{a_{11} a_{22}} | . \end{matrix}$
故 J 迭代法与 GS 迭代法同时收敛或发散.
$\begin{aligned} R (B_{J}) & = - \ln ρ (B_{J}) = - \frac{1}{2} \ln | \frac{a_{12} a_{21}}{a_{11} a_{22}} |, \\ R (B_{S}) & = - \ln ρ (B_{S}) = - \ln | \frac{a_{12} a_{21}}{a_{11} a_{22}} |, \end{aligned}$
$1 : 2$ .

6.3 超松弛迭代法

6.3.1 逐次超松弛迭代法 SOR

$\bm A = \bm M - \bm N$ .
- $\bm A = \bm D - \bm L - \bm U$ .
- $\bm M = \dfrac{1}{\omega} (\bm D - \omega \bm L)$ .
- $\bm N = \dfrac{1-\omega}{\omega} \bm D + \bm U$ .
$\bm A \bm x = \bm b \RLA \bm x = \bm L_\omega \bm x + \bm f$ .
- $(\bm D - \omega \bm L) \bm x = \pqty{(1 - \omega) \bm D + \omega \bm U} \bm x + \omega \bm b$ .
- $\bm L_\omega = (\bm D - \omega \bm L)\inv ((1 - \omega) \bm D + \omega \bm U)$ .
- $\bm f = \omega(\bm D - \omega \bm L)\inv \bm b$ .
迭代
- $\bm x^{(k+1)} = \bm L_\omega \bm x^{(k)} + \bm f, k \in \N$ .
- $\bm x^{(k+1)} = \bm x^{(k)} + \omega \bm D\inv (\bm b + \bm L \bm x^{(k+1)} + \bm U \bm x^{(k)} - \bm D \bm x^{(k)})$ .
- $\Delta x_i = \dfrac{\omega}{a_{ii}} \pqty{b_i - \dsum_{j=1}^{i-1} a_{ij} x_j^{(k+1)} - \dsum_{j=i}^n a_{ij} x_j^{(k)}}$ .
- $\wt{\bm x}^{(k+1)}$ $\bm x^{(k+1)} = (1 - \omega) \bm x^{(k)} + \omega \wt{\bm x}^{(k+1)}$ .
参数说明
- $\omega = 1$ 时，退化为高斯-塞德尔迭代法.
- $\omega > 1$ 时，称为超松弛迭代法.
- $\omega < 1$ 时，称为低松弛迭代法.

6.3.2 SOR 迭代法的收敛性

定理（SOR 迭代法的收敛性） $\bm A \bm x = \bm b$ ，SOR 迭代法收敛性的条件为：

$0 < \omega < 2$ .
$0 < \omega < 2$ $\bm A$ 对称正定.
$0 < \omega \le 1$ $\bm A$ 严格对角占优或不可约弱对角占优.

证明

$0 < \omega < 2$ .

\begin{aligned} \det (L_{ω}) & = \det [(D - ω L)^{- 1}] \det [(1 - ω) D + ω U] = (1 - ω)^{n} \\ = | λ_{1} λ_{2} \dots λ_{n} | \leq ρ (L_{ω})^{n} < 1 \Leftrightarrow 0 < ω < 2. \end{aligned}

$0 < \omega < 2$ $\bm A$ 对称正定.

$\bm L_\omega = (\bm D - \omega \bm L)\inv ((1 - \omega) \bm D + \omega \bm U)$ $\lambda$ $\bm L_\omega \bm y = \lambda \bm y$ ，故

\begin{array}{rc} ((1 - ω) D + ω U) y = λ (D - ω L) y \\ \Rightarrow & (((1 - ω) D + ω U) y, y) = λ ((D - ω L) y, y) \\ \Rightarrow & λ = \frac{(D y, y) - ω (D y, y) + ω (U y, y)}{(D y, y) - ω (L y, y)} \end{array}

记

\begin{aligned} (D y, y) & = \sum_{i = 1}^{n} a_{i i} {| y_{i} |}^{2} \equiv σ > 0, \\ - (L y, y) & \equiv α + i β, \end{aligned}

$\bm A = \bm A\trans$ $\bm U = \bm L\trans$ ，于是

\begin{aligned} - (U y, y) & = - y^{T} U y = (L y)^{T} y = - (y, L y) = - \overset{―}{(L y, y)} = α - i β, \\ 0 & < (A y, y) = ((D - L - U) y, y) = σ + 2 α, \end{aligned}

从而

\begin{aligned} λ & = \frac{(σ - ω σ - α ω) + i ω β}{(σ + α ω) + i ω β}, \\ {| λ |}^{2} & = \frac{(σ - ω σ - α ω)^{2} + ω^{2} β^{2}}{(σ + α ω)^{2} + ω^{2} β^{2}}, \end{aligned}

$0 < \omega < 2$ ，分子不为零，且有

\begin{aligned} (σ - ω σ - α ω)^{2} - (σ + α ω)^{2} \\ = ω σ (σ + 2 α) (ω - 2) < 0, \end{aligned}

$\vqty{\lambda} < 1$ ，从而 SOR 迭代法收敛.

$0 < \omega \le 1$ $\bm A$ 严格对角占优或不可约弱对角占优.

$\wt{\bm B}$ $\Norm{\wt{\bm B}} = \wt q < 1$ . 将迭代方程拆分为：

{\begin{cases} {\tilde{x}}^{(k + 1)} = \tilde{B} x^{(k)} + \tilde{f}, \\ x^{(k + 1)} = (1 - ω) x^{(k)} + ω {\tilde{x}}^{(k + 1)} . \end{cases}

$\bm x^{(k)}$ $\wt{\bm x}^{(k)}$ . 于是

\begin{aligned} ‖ ε^{(k + 1)} ‖ & = ‖ (1 - ω) ε^{(k)} + ω ({\tilde{x}}^{(k + 1)} - x^{*}) ‖ \\ \leq (1 - ω) ‖ ε^{(k)} ‖ + ω \tilde{q} ‖ x^{(k)} - x^{*} ‖ \\ = (1 - ω + ω \tilde{q}) ‖ ε^{(k)} ‖ \\ \leq (1 - ω + ω \tilde{q})^{k + 1} ‖ ε (0) ‖, \end{aligned}

$1 - \omega + \omega \wt q < 1$ ，故 SOR 迭代法收敛.

备注 $\omega_\rm{opt} = \dfrac{2}{ 1 + \sqrt{1 - \rho(\bm J)^2} }$ .

第六章 解线性方程组的迭代法