突然想到让deepseek来解释一下递归

密银

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解释的不错
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递归是一种通过将问题分解为更小的同类子问题来解决问题的方法。它的核心思想是：**函数直接或间接地调用自身**，直到满足终止条件。

, C  c( x) u" A- Z% s% E 关键要素
1. **基线条件（Base Case）**
   - 递归终止的条件，防止无限循环
   - 例如：计算阶乘时 n == 0 或 n == 1 时返回 1
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2. **递归条件（Recursive Case）**
   - 将原问题分解为更小的子问题
; D- [8 [6 k; P$ m5 C6 |   - 例如：n! = n × (n-1)!
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2 _5 I  H- C" |+ N5 K2 W 经典示例：计算阶乘
python
def factorial(n):
    if n == 0:        # 基线条件
7 j8 G; P! O6 q8 U0 k, N# H        return 1
    else:             # 递归条件
6 R% s2 X+ t! _5 {1 _        return n * factorial(n-1)
0 _* y" r: H% D) I* ?执行过程（以计算 3! 为例）：
6 O1 R' c, }, ufactorial(3)
) m$ v2 c" N8 W' J# q5 a8 H, z3 * factorial(2)
3 * (2 * factorial(1))
, M# r; t/ G* ^; B& R! |: a; v& j3 * (2 * (1 * factorial(0)))
, d2 o; [4 l( G" k$ t+ R' \3 * (2 * (1 * 1)) = 6
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递归思维要点
% L$ E# n- t' O8 d2 s& @) m1. **信任递归**：假设子问题已经解决，专注当前层逻辑
2. **栈结构**：每次调用都会创建新的栈帧（内存空间）
% F6 A/ ]" u; m6 }2 ?$ K: _( f3. **递推过程**：不断向下分解问题（递）
; Z4 ]/ W9 Q$ z3 o/ ~2 I+ M$ n4. **回溯过程**：组合子问题结果返回（归）

注意事项
) H1 O& _) f$ q7 W7 U, |% H必须要有终止条件
递归深度过大可能导致栈溢出（Python默认递归深度约1000层）
, f. n3 _& {, k$ B6 G% V" X1 L某些问题用递归更直观（如树遍历），但效率可能不如迭代
尾递归优化可以提升效率（但Python不支持）
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, A$ T& O' h# U( @& ` 递归 vs 迭代
7 M0 i  ?1 U* D) {6 ~% @|          | 递归                          | 迭代               |
|----------|-----------------------------|------------------|
| 实现方式    | 函数自调用                        | 循环结构            |
| 内存消耗    | 需要维护调用栈（可能溢出）               | 通常更节省内存         |
| 代码可读性  | 对符合递归思维的问题更直观                | 线性流程更直接         |
# f$ J9 D6 n8 H7 G1 c3 E| 适用场景    | 树结构、分治算法、回溯问题等               | 简单重复操作          |

2 x" V% x0 l, s8 c6 Y 经典递归应用场景
1. 文件系统遍历（目录树结构）
2. 快速排序/归并排序算法
3. 汉诺塔问题
; d1 n" {9 K% `4. 二叉树遍历（前序/中序/后序）
5. 生成所有可能的组合（回溯算法）

试着用递归思维想象：你站在一面镜子前，镜子里有无数个逐渐变小的你在照镜子，这就是递归的直观体现。但记住每个"分身"最终都要有结束的时刻，这就是基线条件的重要性。

testjhy

挺好，递归思维要点与我能够回忆起来我当时写递归程序的思路很一致，，或者被它唤醒，
  c* w  h: D! S/ y1 n我推理机的核心算法应该是二叉树遍历的变种。
& @; u+ f. d/ P, T' I7 J. P另外知识系统的推理机搜索深度(递归深度)并不长，没有超过10层的，如果输入变量多的话，搜索宽度很大，但对那时的286-386DOS系统，计算压力也不算大。

nanimarcus

Recursion in programming is a technique where a function calls itself in order to solve a problem. It is a powerful concept that allows you to break down complex problems into smaller, more manageable subproblems. Here's a detailed explanation:
3 S( w9 @$ d5 P% x/ DKey Idea of Recursion

# U+ |0 E4 o9 P9 l" i6 X3 {  A) VA recursive function solves a problem by:
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  l" l  v- ~; N    Breaking the problem into smaller instances of the same problem.
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    Solving the smallest instance directly (base case).
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    Combining the results of smaller instances to solve the larger problem.

" O2 G  I# j/ U5 ^  h+ uComponents of a Recursive Function
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. v- M7 u7 B4 ?& K& F& a    Base Case:
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        This is the simplest, smallest instance of the problem that can be solved directly without further recursion.

. H2 C8 X, s% E% C, j: b        It acts as the stopping condition to prevent infinite recursion.
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        Example: In calculating the factorial of a number, the base case is factorial(0) = 1.
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    Recursive Case:

        This is where the function calls itself with a smaller or simpler version of the problem.

6 g4 D! x2 i. U        Example: For factorial, the recursive case is factorial(n) = n * factorial(n-1).

8 S- e4 {6 {$ @# \3 o& qExample: Factorial Calculation

4 m. H4 {$ p2 b$ e8 _2 Q0 Z* A7 p* WThe factorial of a number n (denoted as n!) is the product of all positive integers less than or equal to n. It can be defined recursively as:

. |0 g9 o. \3 y  c! x9 _) P    Base case: 0! = 1

    Recursive case: n! = n * (n-1)!

& E- l1 X6 e: [Here’s how it looks in code (Python):
python
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def factorial(n):
$ O) N4 v" n" e8 A4 a* |    # Base case
    if n == 0:
        return 1
    # Recursive case
2 o: l- m% a7 L0 O7 N4 M    else:
        return n * factorial(n - 1)

8 g) l' M5 e) l1 |2 v9 r# Example usage
$ n6 B, P( y1 [% ^7 K/ Tprint(factorial(5))  # Output: 120

/ m# t8 S: t4 {* |8 O& ^4 RHow Recursion Works
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) o7 Y. j" c8 F: l    The function keeps calling itself with smaller inputs until it reaches the base case.

% v+ \; e. B, l6 Z, N; p! \1 A    Once the base case is reached, the function starts returning values back up the call stack.
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- Q, K; q, P6 x+ n: g    These returned values are combined to produce the final result.
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For factorial(5):


" n" B; Z! f6 n# w5 Sfactorial(5) = 5 * factorial(4)
/ b4 E4 L/ N7 W6 Ofactorial(4) = 4 * factorial(3)
factorial(3) = 3 * factorial(2)
factorial(2) = 2 * factorial(1)
factorial(1) = 1 * factorial(0)
factorial(0) = 1  # Base case
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  r7 T6 i& [: P" Z/ ~4 XThen, the results are combined:

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; B& {$ o/ Q1 I2 I% ]+ `) M9 sfactorial(1) = 1 * 1 = 1
9 |0 ~  S6 Z. y) B3 afactorial(2) = 2 * 1 = 2
" u  q( g. [+ |' Sfactorial(3) = 3 * 2 = 6
+ y, E! Q* T  e7 P8 d# s6 l# Efactorial(4) = 4 * 6 = 24
. t3 s2 b. \" y1 g% g2 g+ yfactorial(5) = 5 * 24 = 120

$ }% y) {4 n' u7 A4 pAdvantages of Recursion

4 X5 I( O& D9 a+ E- u1 e    Simplicity: Recursive solutions are often more intuitive and easier to write for problems that have a natural recursive structure (e.g., tree traversals, divide-and-conquer algorithms).

    Readability: Recursive code can be more readable and concise compared to iterative solutions.
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Disadvantages of Recursion
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    Performance Overhead: Each recursive call adds a new layer to the call stack, which can lead to high memory usage and potential stack overflow for deep recursion.
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- I. I0 h" i5 \    Inefficiency: Some problems can be solved more efficiently using iteration (e.g., Fibonacci sequence without memoization).

When to Use Recursion

    Problems that can be broken down into smaller, similar subproblems (e.g., tree traversals, sorting algorithms like quicksort and mergesort).
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$ e* o$ x4 I3 _+ g0 [    Problems with a clear base case and recursive case.
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Example: Fibonacci Sequence

1 f2 \: n9 n( w! j4 S2 DThe Fibonacci sequence is another classic example of recursion. Each number is the sum of the two preceding ones:

    Base case: fib(0) = 0, fib(1) = 1
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$ u1 K- E; P! a+ }6 @7 K" C0 C    Recursive case: fib(n) = fib(n-1) + fib(n-2)

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def fibonacci(n):
* k+ W0 {1 L3 V5 l    # Base cases
# z7 }4 M& Q/ i+ X% z& `: _! w    if n == 0:
( v; f( x8 ~' x! k        return 0
4 ~% {0 ~7 N/ N" |! s/ r$ h7 S  b    elif n == 1:
* }3 W/ W; G! e% G        return 1
  N, T, x5 q1 V    # Recursive case
# K1 q; W% V; j! W/ b    else:
        return fibonacci(n - 1) + fibonacci(n - 2)
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* l# ~) [1 K8 r* P+ a. g# Example usage
' S/ ~8 K3 t" \1 s$ kprint(fibonacci(6))  # Output: 8

+ F: M# f' H# p( l" kTail Recursion
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9 W2 _3 i# P6 |0 gTail recursion is a special case of recursion where the recursive call is the last operation in the function. Some programming languages optimize tail-recursive functions to avoid stack overflow, but not all languages (e.g., Python does not optimize tail recursion).
3 Z6 A8 d2 D. b  @% w' G
; K/ b+ ~. ~' K& \In summary, recursion is a fundamental concept in programming that allows you to solve problems by breaking them into smaller, self-similar subproblems. It’s important to define a base case to avoid infinite recursion and to understand the trade-offs between recursion and iteration.

nanimarcus

我还让Deepseek 给我讲讲Linux Kernel Driver 现在的开发流程，让一个老同志复习复习，快忘光了。