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目录

• [TOC]

题目链接

bzoj1563: [NOI2009]诗人小G

题解

\(n^2\) 的dp长这样

\(f_i = min(f_j + (sum_i - sum_j - 1 - L)^P)\)

设\(w_{ij} = (sum_i - sum_j - 1 - L)^P\)

那么化成1D1D的标准形式

$ f_i = min(f_j + w_{i,j}) $

发现w满足四边形不等式

证明可以看这里

https://www.byvoid.com/zhs/blog/noi-2009-poet

因此状态转移方程具有单调性

代码

#include<cstdio>

#include<cstring>

#include<algorithm>

#define LL long long

#define gc getchar()

#define pc putchar

#define LD long double

inline int read() {

    int x = 0,f = 1;

    char c = gc;

    while(c < '0' || c > '9' )c = gc;

    while(c <= '9' && c >= '0') x = x * 10 + c - '0',c = gc;

    return x * f ;

}

void print(LL x) {

    if(x >= 10) print(x / 10);

    pc(x % 10 + '0');

}

const int maxn = 100007;

char s[maxn][32];

int n,L,p;

inline LD fstpow(LD x,int k) {

    LD ret = 1;

    for(;k;k >>= 1,x = x * x) if(k & 1) ret *= x;

    return ret;

}

LD f[maxn];

int sum[maxn];

LD calc(int j,int i) {

    return f[j] + fstpow(std::abs(sum[i] - sum[j] - L),p);

}

int find(int x,int y) {

    int l = x,r = n,ret = 0;

    while(l <= r) {

        int mid = l + r >> 1;

        if(calc(x,mid) >= calc(y,mid)) r = mid - 1;

        else l = mid + 1;

    }

    return l;

}

int q[maxn],c[maxn];

int pre[maxn];

void solve() {

    n = read(),L = read() + 1,p = read();

    for(int i = 1;i <= n;++ i) {

        scanf("%s",s[i] + 1);

        sum[i] = sum[i - 1] + strlen(s[i] + 1) + 1;

    }

    int h = 1,t = 1;

    q[h] = 0;

    for(int i = 1;i <= n;++ i) {

        while(h < t && c[h] <= i) ++ h;

        f[i] = calc(q[h],i); pre[i] = q[h];

        while(h < t && c[t - 1] >= find(q[t],i)) t --;

        c[t] = find(q[t],i); q[++ t] = i;

    }

    if(f[n] > 1e18) {

        puts("Too hard to arrange\n--------------------");

        return;

    }

    printf("%.0Lf\n", f[n]); 

    puts("--------------------");

}

int main() {

    int T = read();

    for(int i = 1; i <= T; ++ i) {

        solve();

    }

    return 0;

}