6.6 Riemann引理积分第二中值定理

1 Riemann 引理

Riemann 引理

设 $f (x) \in R [a, b]$ , 则

\begin{matrix} (1.1) & lim_{λ \to + \infty} \int_{a}^{b} f (x) \sin (λ x) d x = lim_{λ \to + \infty} \int_{a}^{b} f (x) \cos (λ x) d x = 0. \end{matrix}

证明

由于 $f (x) \in R [a, b]$ , 则 $\forall ε > 0$ , 存在阶梯函数 $p (x) = c_{k}, x \in [x_{k - 1}, x_{k}], k = 1, \dots, p$ , 使得

\int_{a}^{b} | f (x) - p (x) | d x < ε .

于是

\begin{aligned} | \int_{a}^{b} f (x) \sin (λ x) d x | & = | \int_{a}^{b} [f (x) - p (x)] \sin (λ x) d x + \int_{a}^{b} p (x) \sin (λ x) d x | \\ \leq \int_{a}^{b} | f (x) - p (x) | \cdot | \sin (λ x) | d x + | \sum_{k = 1}^{p} \int_{x_{k - 1}}^{x_{k}} c_{k} \sin (λ x) d x | \\ \leq ε + | \sum_{k = 1}^{p} c_{k} {\frac{- \cos (λ x)}{λ} |}_{x_{k - 1}}^{x_{k}} | \leq ε + \sum_{k = 1}^{p} | c_{k} | \frac{2}{λ} . \end{aligned}

由于 $lim_{λ \to + \infty} \sum_{k = 1}^{p} | c_{k} | \frac{2}{λ} = 0$ , 于是对于 $ε > 0, \exists X > 0, \forall λ > X : \sum_{k = 1}^{p} | c_{k} | \frac{2}{λ} < ε$ , 从而

| \int_{a}^{b} f (x) \sin (λ x) d x | < ε + ε = 2 ε .

也即 $lim_{λ \to + \infty} \int_{a}^{b} f (x) \sin (λ x) d x = 0$ . 同理 $lim_{λ \to + \infty} \int_{a}^{b} f (x) \cos (λ x) d x = 0$ .

推论

设 $f (x) \in R [a, b]$ , $g (x)$ 是 $R$ 上以 $T$ 为周期的函数, 且 $g (x) \in R [0, T]$ , 则

\begin{matrix} (1.2) & lim_{λ \to + \infty} \int_{a}^{b} f (x) g (λ x) d x = \frac{1}{T} \int_{0}^{T} g (x) d x \cdot \int_{a}^{b} f (x) d x . \end{matrix}

证明

分三步进行证明.

第一步: 设 $f (x) \equiv 1$ . 由于我们考虑的是 $λ \to + \infty$ 的极限, 故不妨设 $λ > 0$ . 令 $n = ⌊ \frac{λ (b - a)}{T} ⌋ \in N$ , 则

\begin{aligned} \int_{a}^{b} g (λ x) d x & = \int_{a}^{a + \frac{n T}{λ}} g (λ x) d x + \int_{a + \frac{n T}{λ}}^{b} g (λ x) d x \\ = n \int_{0}^{\frac{T}{λ}} g (λ x) d x + \int_{a + \frac{n T}{λ}}^{b} g (λ x) d x \\ = ⌊ \frac{λ (b - a)}{T} ⌋ \frac{1}{λ} \int_{0}^{T} g (x) d x + \int_{a + \frac{n T}{λ}}^{b} g (λ x) d x \\ = ⌊ \frac{λ (b - a)}{T} ⌋ \frac{T}{λ} \cdot \frac{1}{T} \int_{0}^{T} g (x) d x + \int_{a + \frac{n T}{λ}}^{b} g (λ x) d x . \end{aligned}

注意到

b - a - \frac{T}{λ} < ⌊ \frac{λ (b - a)}{T} ⌋ \frac{T}{λ} \leq b - a \Rightarrow lim_{λ \to + \infty} ⌊ \frac{λ (b - a)}{T} ⌋ \frac{T}{λ} = b - a .

又 $g (x) \in R [a, b] \Rightarrow g (x)$ 有界 (设上界是 $M_{g}$ ), 故又有

| \int_{a + \frac{n T}{λ}}^{b} g (λ x) d x | \leq M_{g} (b - a - \frac{n T}{λ}) \to 0, λ \to + \infty .

于是

\begin{aligned} lim_{λ \to + \infty} \int_{a}^{b} f (x) g (λ x) d x = lim_{λ \to + \infty} \int_{a}^{b} g (λ x) d x \\ = & (b - a) \frac{1}{T} \int_{0}^{T} g (x) d x = \frac{1}{T} \int_{0}^{T} g (x) d x \int_{a}^{b} f (x) d x . \end{aligned}

第二步: 设 $f (x)$ 是阶梯型函数, 即存在 $[a, b]$ 的分割 $π : a = x_{0} < x_{1} < \dots < x_{m} = b$ , 使得

f (x) = {\begin{aligned} c_{k}, x \in [x_{k - 1}, x_{k}), \\ c_{m}, x \in [x_{m - 1}, x_{m}], \end{aligned} k = 1, \dots, m - 1.

则有

\begin{aligned} lim_{λ \to + \infty} \int_{a}^{b} f (x) g (λ x) d x \\ = & lim_{λ \to + \infty} \sum_{k = 1}^{m} \int_{x_{k - 1}}^{x_{k}} c_{k} g (λ x) d x = \sum_{k = 1}^{m} c_{k} lim_{λ \to + \infty} \int_{x_{k - 1}}^{x_{k}} g (λ x) d x \\ = & \sum_{k = 1}^{m} c_{k} (x_{k} - x_{k - 1}) \frac{1}{T} \int_{0}^{T} g (x) d x = \frac{1}{T} \int_{0}^{T} g (x) d x \int_{a}^{b} f (x) d x . \end{aligned}

这里用到了第一步得出的结论.

第三步: 对一般的 $f (x) \in R [a, b]$ , $\forall ε > 0$ , $\exists π \subset [a, b]$ : $a = x_{0} < x_{1} < \dots < x_{m} = b$ 和对应值点下的 Riemann 和 $S (π)$ , 使得 $| \int_{a}^{b} f (x) d x - S (π) | < \frac{ε}{3 M_{g} + 1} .$ 取 $c_{k} = inf_{[x_{k - 1}, x_{k}]} f (x)$ , 记相应的阶梯形函数为 $L (x)$ , 则 $S (π) = \int_{a}^{b} L (x) d x$ , 且 $| \int_{a}^{b} f (x) d x - S (π) | = | \int_{a}^{b} [f (x) - L (x)] d x | = \int_{a}^{b} | f (x) - L (x) | d x .$ 由第二步的已知结论, 对上述 $ε > 0, \exists Λ > 0, \forall λ > Λ$ : $| \int_{a}^{b} L (x) g (λ x) d x - \frac{1}{T} \int_{0}^{T} g (x) d x \int_{a}^{b} L (x) d x | < ε,$ 于是 $\begin{aligned} | \int_{a}^{b} f (x) g (λ x) d x - \frac{1}{T} \int_{0}^{T} g (x) d x \int_{a}^{b} f (x) d x | \\ \leq & | \int_{a}^{b} [f (x) - L (x)] g (λ x) d x | + | \int_{a}^{b} L (x) g (λ x) d x - \frac{1}{T} \int_{0}^{T} g (x) d x \int_{a}^{b} L (x) d x | \\ + | \frac{1}{T} \int_{0}^{T} g (x) d x \int_{a}^{b} [L (x) - f (x)] d x | \\ < & \frac{ε}{3} + \frac{ε}{3} + \frac{ε}{3} = ε . \end{aligned}$

从而得到结论.

2 积分第二中值定理

Abel 变换

考虑两组数 $a_{k}, b_{k}, k = 1, \dots, n$ . 令 $B_{0} = 0, B_{k} = \sum_{j = 1}^{k} b_{j}, k = 1, \dots, n$ . 则

\sum_{k = 1}^{n} a_{k} b_{k} = a_{n} B_{n} - \sum_{k = 1}^{n - 1} B_{k} (a_{k + 1} - a_{k}) .

证明

由已知,

\begin{aligned} \sum_{k = 1}^{n} a_{k} b_{k} & = \sum_{k = 1}^{n} a_{k} (B_{k} - B_{k - 1}) = \sum_{k = 1}^{n} a_{k} B_{k} - \sum_{k = 1}^{n} a_{k} B_{k - 1} \\ = \sum_{k = 1}^{n} a_{k} B_{k} - \sum_{i = 2}^{n} a_{i} B_{i - 1} = a_{n} B_{n} - \sum_{k = 1}^{n - 1} B_{k} (a_{k + 1} - a_{k}) . \end{aligned}

于是结论得证.

设 $f (x) \in R [a, b]$ , $g (x)$ 在 $[a, b]$ 上单调, 则 $\exists ξ \in [a, b]$ :

\int_{a}^{b} f (x) g (x) d x = g (a) \int_{a}^{ξ} f (x) d x + g (b) \int_{ξ}^{b} f (x) d x .

证明

取分割 $π : a = x_{0} < x_{1} < \cdot \cdot \cdot < x_{n} = b$ , 则

\begin{aligned} \int_{a}^{b} f (x) g (x) d x = \sum_{k = 1}^{n} \int_{x_{k - 1}}^{x_{k}} f (x) g (x) d x . \\ (*) & = & \sum_{k = 1}^{n} \int_{x_{k - 1}}^{x_{k}} f (x) g (x_{k}) d x - \sum_{k = 1}^{n} \int_{x_{k - 1}}^{x_{k}} f (x) [g (x_{k}) - g (x)] d x . \end{aligned}

由于

\begin{aligned} | \sum_{k = 1}^{n} \int_{x_{k - 1}}^{x_{k}} f (x) [g (x_{k}) - g (x)] d x | \\ \leq & \sum_{k = 1}^{n} \int_{x_{k - 1}}^{x_{k}} | f (x) | | g (x_{k}) - g (x) | d x \\ \leq & \sum_{k = 1}^{n} M_{f} ω_{k} (g) Δ x_{k} \to 0 (| | π | | \to 0), \end{aligned}

因此在(*)中令 $| | π | | \to 0$ , 得

\int_{a}^{b} f (x) g (x) d x = lim_{| | π | | \to 0} \sum_{k = 1}^{n} g (x_{k}) \int_{x_{k - 1}}^{x_{k}} f (x) d x .

注意到 $g (x)$ 的单调性, 不妨设其单调增. 令 $F (x) = \int_{a}^{x} f (t) d t \in C [a, b]$ , 则 $F (x_{0}) = F (a) = 0$ . 应用 Abel 变换, 得

\begin{aligned} \sum_{k = 1}^{n} g (x_{k}) \int_{x_{k - 1}}^{x_{k}} f (x) d x = \sum_{k = 1}^{n} g (x_{k}) [F (x_{k}) - F (x_{k - 1})] \\ = & g (x_{n}) [F (x_{n}) - F (x_{0})] - \sum_{k = 1}^{n - 1} [F (x_{k}) - F (x_{0})] [g (x_{k + 1}) - g (x_{k})] \\ = & g (b) F (b) - \sum_{k = 1}^{n - 1} F (x_{k}) [g (x_{k + 1} - g (x_{k}))] . \end{aligned}

于是 $\begin{aligned} \sum_{k = 1}^{n - 1} F (x_{k}) [g (x_{k + 1}) - g (x_{k})] = \sum_{k = 0}^{n - 1} F (x_{k}) [g (x_{k + 1}) - g (x_{k})] \\ \leq & M \sum_{k = 1}^{n - 1} [g (x_{k + 1}) - g (x_{k})] = M [g (b) - g (a)], \end{aligned}$ 同理 $\sum_{k = 1}^{n - 1} F (x_{k}) [g (x_{k + 1}) - g (x_{k})] \geq m [g (b) - g (a)] .$ 于是 $m \leq \frac{g (b) F (b) - \sum_{k = 1}^{n} \int_{x_{k - 1}}^{x_{k}} g (x_{k}) f (x) d x}{g (b) - g (a)} \leq M .$ 令 $| | π | | \to 0$ , 有 $m \leq \frac{g (b) F (b) - \int_{a}^{b} g (x) f (x) d x}{g (b) - g (a)} \leq M .$ 从而 $\exists ξ \in [a, b]$ : $\begin{aligned} \frac{g (b) F (b) - \int_{a}^{b} g (x) f (x) d x}{g (b) - g (a)} = F (ξ) = \int_{a}^{ξ} f (t) d t \\ \Rightarrow & g (b) \int_{a}^{b} f (t) d t - \int_{a}^{b} g (x) f (x) d x = g (b) \int_{a}^{ξ} f (t) d t - g (a) \int_{a}^{ξ} f (t) d t . \end{aligned}$ 整理即得结论形式.

另见积分中值定理和积分第一中值定理 ↩︎