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<p>算法 <code>A</code> 只有 <span class="arithmatex">\(1\)</span> 个打印操作,算法运行时间不随着 <span class="arithmatex">\(n\)</span> 增大而增长。我们称此算法的时间复杂度为“常数阶”</p>
<p>算法 <code>B</code> 中的打印操作需要循环 <span class="arithmatex">\(n\)</span> 次,算法运行时间随着 <span class="arithmatex">\(n\)</span> 增大呈线性增长。此算法的时间复杂度被称为“线性阶”。</p>
<p>算法 <code>C</code> 中的打印操作需要循环 <span class="arithmatex">\(1000000\)</span> 次,虽然运行时间很长,但它与输入数据大小 <span class="arithmatex">\(n\)</span> 无关。因此 <code>C</code> 的时间复杂度和 <code>A</code> 相同,仍为“常数阶”。</p>
<p>下图展示了以上三个算法函数的时间复杂度</p>
<ul>
<li>算法 <code>A</code> 只有 <span class="arithmatex">\(1\)</span> 个打印操作,算法运行时间不随着 <span class="arithmatex">\(n\)</span> 增大而增长。我们称此算法的时间复杂度为“常数阶”。</li>
<li>算法 <code>B</code> 中的打印操作需要循环 <span class="arithmatex">\(n\)</span> 次,算法运行时间随着 <span class="arithmatex">\(n\)</span> 增大呈线性增长。此算法的时间复杂度被称为“线性阶”。</li>
<li>算法 <code>C</code> 中的打印操作需要循环 <span class="arithmatex">\(1000000\)</span> 次,虽然运行时间很长,但它与输入数据大小 <span class="arithmatex">\(n\)</span> 无关。因此 <code>C</code> 的时间复杂度和 <code>A</code> 相同,仍为“常数阶”。</li>
</ul>
<p><img alt="算法 A 、B 和 C 的时间增长趋势" src="../time_complexity.assets/time_complexity_simple_example.png" /></p>
<p align="center"> 图:算法 A 、B 和 C 的时间增长趋势 </p>
@@ -4370,7 +4373,7 @@ T(n) &amp; = n^2 + n &amp; \text{偷懒统计 (o.O)}
</div>
<h3 id="2">2. &nbsp; 第二步:判断渐近上界<a class="headerlink" href="#2" title="Permanent link">&para;</a></h3>
<p><strong>时间复杂度由多项式 <span class="arithmatex">\(T(n)\)</span> 中最高阶的项来决定</strong>。这是因为在 <span class="arithmatex">\(n\)</span> 趋于无穷大时,最高阶的项将发挥主导作用,其他项的影响都可以被忽略。</p>
<p>下表展示了一些例子,其中一些夸张的值是为了强调“系数无法撼动阶数”这一结论。当 <span class="arithmatex">\(n\)</span> 趋于无穷大时,这些常数变得无足轻重。</p>
<p>下表展示了一些例子,其中一些夸张的值是为了强调“系数无法撼动阶数”这一结论。当 <span class="arithmatex">\(n\)</span> 趋于无穷大时,这些常数变得无足轻重。</p>
<p align="center"> 表:不同操作数量对应的时间复杂度 </p>
<div class="center-table">
@@ -4406,7 +4409,7 @@ T(n) &amp; = n^2 + n &amp; \text{偷懒统计 (o.O)}
</table>
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<h2 id="224">2.2.4 &nbsp; 常见类型<a class="headerlink" href="#224" title="Permanent link">&para;</a></h2>
<p>设输入数据大小为 <span class="arithmatex">\(n\)</span> ,常见的时间复杂度类型包括(按照从低到高的顺序排列)</p>
<p>设输入数据大小为 <span class="arithmatex">\(n\)</span> ,常见的时间复杂度类型如下图所示(按照从低到高的顺序排列)</p>
<div class="arithmatex">\[
\begin{aligned}
O(1) &lt; O(\log n) &lt; O(n) &lt; O(n \log n) &lt; O(n^2) &lt; O(2^n) &lt; O(n!) \newline
@@ -5275,7 +5278,8 @@ O(1) &lt; O(\log n) &lt; O(n) &lt; O(n \log n) &lt; O(n^2) &lt; O(2^n) &lt; O(n!
</div>
</div>
<h3 id="4-o2n">4. &nbsp; 指数阶 <span class="arithmatex">\(O(2^n)\)</span><a class="headerlink" href="#4-o2n" title="Permanent link">&para;</a></h3>
<p>生物学的“细胞分裂”是指数阶增长的典型例子:初始状态为 <span class="arithmatex">\(1\)</span> 个细胞,分裂一轮后变为 <span class="arithmatex">\(2\)</span> 个,分裂两轮后变为 <span class="arithmatex">\(4\)</span> 个,以此类推,分裂 <span class="arithmatex">\(n\)</span> 轮后有 <span class="arithmatex">\(2^n\)</span> 个细胞。相关代码如下:</p>
<p>生物学的“细胞分裂”是指数阶增长的典型例子:初始状态为 <span class="arithmatex">\(1\)</span> 个细胞,分裂一轮后变为 <span class="arithmatex">\(2\)</span> 个,分裂两轮后变为 <span class="arithmatex">\(4\)</span> 个,以此类推,分裂 <span class="arithmatex">\(n\)</span> 轮后有 <span class="arithmatex">\(2^n\)</span> 个细胞。</p>
<p>以下代码和图模拟了细胞分裂的过程,时间复杂度为 <span class="arithmatex">\(O(2^n)\)</span></p>
<div class="tabbed-set tabbed-alternate" data-tabs="10:12"><input checked="checked" id="__tabbed_10_1" name="__tabbed_10" type="radio" /><input id="__tabbed_10_2" name="__tabbed_10" type="radio" /><input id="__tabbed_10_3" name="__tabbed_10" type="radio" /><input id="__tabbed_10_4" name="__tabbed_10" type="radio" /><input id="__tabbed_10_5" name="__tabbed_10" type="radio" /><input id="__tabbed_10_6" name="__tabbed_10" type="radio" /><input id="__tabbed_10_7" name="__tabbed_10" type="radio" /><input id="__tabbed_10_8" name="__tabbed_10" type="radio" /><input id="__tabbed_10_9" name="__tabbed_10" type="radio" /><input id="__tabbed_10_10" name="__tabbed_10" type="radio" /><input id="__tabbed_10_11" name="__tabbed_10" type="radio" /><input id="__tabbed_10_12" name="__tabbed_10" type="radio" /><div class="tabbed-labels"><label for="__tabbed_10_1">Java</label><label for="__tabbed_10_2">C++</label><label for="__tabbed_10_3">Python</label><label for="__tabbed_10_4">Go</label><label for="__tabbed_10_5">JS</label><label for="__tabbed_10_6">TS</label><label for="__tabbed_10_7">C</label><label for="__tabbed_10_8">C#</label><label for="__tabbed_10_9">Swift</label><label for="__tabbed_10_10">Zig</label><label for="__tabbed_10_11">Dart</label><label for="__tabbed_10_12">Rust</label></div>
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@@ -5478,11 +5482,10 @@ O(1) &lt; O(\log n) &lt; O(n) &lt; O(n \log n) &lt; O(n^2) &lt; O(2^n) &lt; O(n!
</div>
</div>
</div>
<p>下图展示了细胞分裂的过程。</p>
<p><img alt="指数阶的时间复杂度" src="../time_complexity.assets/time_complexity_exponential.png" /></p>
<p align="center"> 图:指数阶的时间复杂度 </p>
<p>在实际算法中,指数阶常出现于递归函数中。例如以下代码,其递归地一分为二,经过 <span class="arithmatex">\(n\)</span> 次分裂后停止:</p>
<p>在实际算法中,指数阶常出现于递归函数中。例如以下代码,其递归地一分为二,经过 <span class="arithmatex">\(n\)</span> 次分裂后停止:</p>
<div class="tabbed-set tabbed-alternate" data-tabs="11:12"><input checked="checked" id="__tabbed_11_1" name="__tabbed_11" type="radio" /><input id="__tabbed_11_2" name="__tabbed_11" type="radio" /><input id="__tabbed_11_3" name="__tabbed_11" type="radio" /><input id="__tabbed_11_4" name="__tabbed_11" type="radio" /><input id="__tabbed_11_5" name="__tabbed_11" type="radio" /><input id="__tabbed_11_6" name="__tabbed_11" type="radio" /><input id="__tabbed_11_7" name="__tabbed_11" type="radio" /><input id="__tabbed_11_8" name="__tabbed_11" type="radio" /><input id="__tabbed_11_9" name="__tabbed_11" type="radio" /><input id="__tabbed_11_10" name="__tabbed_11" type="radio" /><input id="__tabbed_11_11" name="__tabbed_11" type="radio" /><input id="__tabbed_11_12" name="__tabbed_11" type="radio" /><div class="tabbed-labels"><label for="__tabbed_11_1">Java</label><label for="__tabbed_11_2">C++</label><label for="__tabbed_11_3">Python</label><label for="__tabbed_11_4">Go</label><label for="__tabbed_11_5">JS</label><label for="__tabbed_11_6">TS</label><label for="__tabbed_11_7">C</label><label for="__tabbed_11_8">C#</label><label for="__tabbed_11_9">Swift</label><label for="__tabbed_11_10">Zig</label><label for="__tabbed_11_11">Dart</label><label for="__tabbed_11_12">Rust</label></div>
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@@ -5594,7 +5597,8 @@ O(1) &lt; O(\log n) &lt; O(n) &lt; O(n \log n) &lt; O(n^2) &lt; O(2^n) &lt; O(n!
</div>
<p>指数阶增长非常迅速,在穷举法(暴力搜索、回溯等)中比较常见。对于数据规模较大的问题,指数阶是不可接受的,通常需要使用动态规划或贪心等算法来解决。</p>
<h3 id="5-olog-n">5. &nbsp; 对数阶 <span class="arithmatex">\(O(\log n)\)</span><a class="headerlink" href="#5-olog-n" title="Permanent link">&para;</a></h3>
<p>与指数阶相反,对数阶反映了“每轮缩减到一半”的情况。设输入数据大小为 <span class="arithmatex">\(n\)</span> ,由于每轮缩减到一半,因此循环次数是 <span class="arithmatex">\(\log_2 n\)</span> ,即 <span class="arithmatex">\(2^n\)</span> 的反函数。相关代码如下:</p>
<p>与指数阶相反,对数阶反映了“每轮缩减到一半”的情况。设输入数据大小为 <span class="arithmatex">\(n\)</span> ,由于每轮缩减到一半,因此循环次数是 <span class="arithmatex">\(\log_2 n\)</span> ,即 <span class="arithmatex">\(2^n\)</span> 的反函数。</p>
<p>以下代码和图模拟了“每轮缩减到一半”的过程,时间复杂度为 <span class="arithmatex">\(O(\log_2 n)\)</span> ,简记为 <span class="arithmatex">\(O(\log n)\)</span></p>
<div class="tabbed-set tabbed-alternate" data-tabs="12:12"><input checked="checked" id="__tabbed_12_1" name="__tabbed_12" type="radio" /><input id="__tabbed_12_2" name="__tabbed_12" type="radio" /><input id="__tabbed_12_3" name="__tabbed_12" type="radio" /><input id="__tabbed_12_4" name="__tabbed_12" type="radio" /><input id="__tabbed_12_5" name="__tabbed_12" type="radio" /><input id="__tabbed_12_6" name="__tabbed_12" type="radio" /><input id="__tabbed_12_7" name="__tabbed_12" type="radio" /><input id="__tabbed_12_8" name="__tabbed_12" type="radio" /><input id="__tabbed_12_9" name="__tabbed_12" type="radio" /><input id="__tabbed_12_10" name="__tabbed_12" type="radio" /><input id="__tabbed_12_11" name="__tabbed_12" type="radio" /><input id="__tabbed_12_12" name="__tabbed_12" type="radio" /><div class="tabbed-labels"><label for="__tabbed_12_1">Java</label><label for="__tabbed_12_2">C++</label><label for="__tabbed_12_3">Python</label><label for="__tabbed_12_4">Go</label><label for="__tabbed_12_5">JS</label><label for="__tabbed_12_6">TS</label><label for="__tabbed_12_7">C</label><label for="__tabbed_12_8">C#</label><label for="__tabbed_12_9">Swift</label><label for="__tabbed_12_10">Zig</label><label for="__tabbed_12_11">Dart</label><label for="__tabbed_12_12">Rust</label></div>
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@@ -5864,7 +5868,7 @@ O(1) &lt; O(\log n) &lt; O(n) &lt; O(n \log n) &lt; O(n^2) &lt; O(2^n) &lt; O(n!
<div class="arithmatex">\[
O(\log_m n) = O(\log_k n / \log_k m) = O(\log_k n)
\]</div>
<p>因此我们通常会省略底数 <span class="arithmatex">\(m\)</span> ,将对数阶直接记为 <span class="arithmatex">\(O(\log n)\)</span></p>
<p>也就是说,底数 <span class="arithmatex">\(m\)</span> 可以在不影响复杂度的前提下转换。因此我们通常会省略底数 <span class="arithmatex">\(m\)</span> ,将对数阶直接记为 <span class="arithmatex">\(O(\log n)\)</span></p>
</div>
<h3 id="6-on-log-n">6. &nbsp; 线性对数阶 <span class="arithmatex">\(O(n \log n)\)</span><a class="headerlink" href="#6-on-log-n" title="Permanent link">&para;</a></h3>
<p>线性对数阶常出现于嵌套循环中,两层循环的时间复杂度分别为 <span class="arithmatex">\(O(\log n)\)</span><span class="arithmatex">\(O(n)\)</span> 。相关代码如下:</p>
@@ -6030,6 +6034,7 @@ O(\log_m n) = O(\log_k n / \log_k m) = O(\log_k n)
</div>
</div>
</div>
<p>下图展示了线性对数阶的生成方式。二叉树的每一层的操作总数都为 <span class="arithmatex">\(n\)</span> ,树共有 <span class="arithmatex">\(\log_2 n + 1\)</span> 层,因此时间复杂度为 <span class="arithmatex">\(O(n \log n)\)</span></p>
<p><img alt="线性对数阶的时间复杂度" src="../time_complexity.assets/time_complexity_logarithmic_linear.png" /></p>
<p align="center"> 图:线性对数阶的时间复杂度 </p>
@@ -6039,7 +6044,7 @@ O(\log_m n) = O(\log_k n / \log_k m) = O(\log_k n)
<div class="arithmatex">\[
n! = n \times (n - 1) \times (n - 2) \times \dots \times 2 \times 1
\]</div>
<p>阶乘通常使用递归实现。例如在以下代码,第一层分裂出 <span class="arithmatex">\(n\)</span> 个,第二层分裂出 <span class="arithmatex">\(n - 1\)</span> 个,以此类推,直至第 <span class="arithmatex">\(n\)</span> 层时停止分裂:</p>
<p>阶乘通常使用递归实现。如下图和以下代码所示,第一层分裂出 <span class="arithmatex">\(n\)</span> 个,第二层分裂出 <span class="arithmatex">\(n - 1\)</span> 个,以此类推,直至第 <span class="arithmatex">\(n\)</span> 层时停止分裂:</p>
<div class="tabbed-set tabbed-alternate" data-tabs="15:12"><input checked="checked" id="__tabbed_15_1" name="__tabbed_15" type="radio" /><input id="__tabbed_15_2" name="__tabbed_15" type="radio" /><input id="__tabbed_15_3" name="__tabbed_15" type="radio" /><input id="__tabbed_15_4" name="__tabbed_15" type="radio" /><input id="__tabbed_15_5" name="__tabbed_15" type="radio" /><input id="__tabbed_15_6" name="__tabbed_15" type="radio" /><input id="__tabbed_15_7" name="__tabbed_15" type="radio" /><input id="__tabbed_15_8" name="__tabbed_15" type="radio" /><input id="__tabbed_15_9" name="__tabbed_15" type="radio" /><input id="__tabbed_15_10" name="__tabbed_15" type="radio" /><input id="__tabbed_15_11" name="__tabbed_15" type="radio" /><input id="__tabbed_15_12" name="__tabbed_15" type="radio" /><div class="tabbed-labels"><label for="__tabbed_15_1">Java</label><label for="__tabbed_15_2">C++</label><label for="__tabbed_15_3">Python</label><label for="__tabbed_15_4">Go</label><label for="__tabbed_15_5">JS</label><label for="__tabbed_15_6">TS</label><label for="__tabbed_15_7">C</label><label for="__tabbed_15_8">C#</label><label for="__tabbed_15_9">Swift</label><label for="__tabbed_15_10">Zig</label><label for="__tabbed_15_11">Dart</label><label for="__tabbed_15_12">Rust</label></div>
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