UVA 11584 Partitioning by Palindromes

最新推荐文章于 2019-12-05 11:11:42 发布

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最新推荐文章于 2019-12-05 11:11:42 发布

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分类专栏： DP 文章标签： ACM UVA

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本文介绍了一种使用动态规划算法解决求解给定字符串中所需最少回文子序列数量的问题。通过逐步分析，我们展示了如何将原始问题分解为一系列更小的子问题，并最终找到最优解。

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Problem H: Partitioning by Palindromes

We say a sequence of characters is a palindrome if it is the same written forwards and backwards. For example, 'racecar' is a palindrome, but 'fastcar' is not.

A partition of a sequence of characters is a list of one or more disjoint non-empty groups of consecutive characters whose concatenation yields the initial sequence. For example, ('race', 'car') is a partition of 'racecar' into two groups.

Given a sequence of characters, we can always create a partition of these characters such that each group in the partition is a palindrome! Given this observation it is natural to ask: what is the minimum number of groups needed for a given string such that every group is a palindrome?

For example:

'racecar' is already a palindrome, therefore it can be partitioned into one group.
'fastcar' does not contain any non-trivial palindromes, so it must be partitioned as ('f', 'a', 's', 't', 'c', 'a', 'r').
'aaadbccb' can be partitioned as ('aaa', 'd', 'bccb').

Input begins with the number n of test cases. Each test case consists of a single line of between 1 and 1000 lowercase letters, with no whitespace within.

For each test case, output a line containing the minimum number of groups required to partition the input into groups of palindromes.

Sample Input

3
racecar
fastcar
aaadbccb

Sample Output

1
7
3

Kevin Waugh

#include <iostream>
#include <cstdio>
#include <cstring>
#include <algorithm>
#define maxn 1005
#define INF 10e7
using namespace std;
char s[maxn];
int dp[maxn];
int len;

bool is_Palindrome(int i,int j)
{
    for(int l=i,r=j;l<=j;l++,r--)
    {
        if(s[l]!=s[r])
            return false;
    }
    return true;
}

//dp[i]表示前i个字符所能分解最小回文串的个数
int main()
{
    int n;
    cin>>n;
    while(n--)
    {
        scanf("%s",s+1);
        int len=strlen(s+1);
        for(int i=1;i<=len;i++)
            dp[i]=INF;
            dp[0]=0;
            for(int i=1; i<=len; i++)
                for(int j=1; j<=i; j++)
                if(is_Palindrome(j,i))
                    dp[i]=min(dp[i],dp[j-1]+1);
                cout<<dp[len]<<endl;
    }
    return 0;
}