Home  >  Article  >  Backend Development  >  How to use backtracking to achieve an efficient solution to the full permutation problem in PHP?

How to use backtracking to achieve an efficient solution to the full permutation problem in PHP?

WBOY
WBOYOriginal
2023-09-19 11:53:231286browse

How to use backtracking to achieve an efficient solution to the full permutation problem in PHP?

How to use backtracking to achieve an efficient solution to the full permutation problem in PHP?

The backtracking method is an algorithm commonly used to solve permutation and combination problems. It can search for all possible solutions within a limited time. In PHP, we can use backtracking to solve the full permutation problem and find an efficient solution.

The total permutation problem is a classic permutation and combination problem. Its goal is to find all possible permutations given a set of different elements. For example, for the set of elements {1, 2, 3}, all possible arrangements are {1, 2, 3}, {1, 3, 2}, {2, 1, 3}, {2, 3, 1} , {3, 1, 2}, {3, 2, 1}.

Below we will introduce how to use the backtracking method to solve the full permutation problem, and give corresponding PHP code examples.

Step 1: Define the recursive function of the full permutation

First, we need to define a recursive function to generate the full permutation. This function will accept the following parameters:

  1. A generated arrangement $curr: used to save the currently generated arrangement
  2. A collection of unselected elements $left: used Save the remaining unselected elements
  3. The storage array of the final result$result: used to save all the full arrangements found

In the recursive function, we need to set a termination condition. When $left is empty, that is, all elements have been selected, $curr is added to $result and returned.

Step 2: Traverse the unselected element collection

In the recursive function, we need to traverse the unselected element collection $left. For each element $ele, we need to do the following:

  1. Remove $ele from $left
  2. Add $ele to $curr
  3. Recursively call the function that generates the full arrangement, passing in the updated $curr and $left
  4. Re-add $ele to $left in order to continue the next cycle

steps 3: Call the recursive function

In the main function, we need to initialize $curr and $left, and create an empty array $result. Then, call the recursive function that generates the full permutation.

Finally, we return $result as the result.

The following is a complete PHP code example:

function permute($nums) {
    $result = [];
    backtrack([], $nums, $result);
    return $result;
}

function backtrack($curr, $left, &$result) {
    if (empty($left)) {
        $result[] = $curr;
        return;
    }

    for ($i = 0; $i < count($left); $i++) {
        $ele = $left[$i];
        array_splice($left, $i, 1);
        array_push($curr, $ele);
        backtrack($curr, $left, $result);
        array_pop($curr);
        array_splice($left, $i, 0, $ele);
    }
}

// Usage example
$nums = [1, 2, 3];
$result = permute($nums);
print_r($result);

In the above example code, we pass the given element collection $nums as a parameter to the main function permute. The recursive function backtrack is called in the main function and the empty arrays $curr and $nums are passed in. In the recursive function, we store the resulting full permutation in $result.

Run the above sample code and all possible arrangements will be output.

By using the backtracking method, we can efficiently solve the full permutation problem in PHP. It should be noted that when solving permutation and combination problems, the time complexity of the backtracking method is O(n!), where n is the number of elements. Therefore, permutation and combination problems involving a large number of elements may result in high time complexity.

The above is the detailed content of How to use backtracking to achieve an efficient solution to the full permutation problem in PHP?. For more information, please follow other related articles on the PHP Chinese website!

Statement:
The content of this article is voluntarily contributed by netizens, and the copyright belongs to the original author. This site does not assume corresponding legal responsibility. If you find any content suspected of plagiarism or infringement, please contact admin@php.cn