Problem
给一个由问号和数字组成的数字串A(问号表示任一数字)。
再给定n个数字Bi,和0~9的数字的价值。
F(x)表示x各个位数上的价值和。问A为何值时,sum(F(Bi+A))的值最大为多少。
1 ≤ A,Bi < 101000 没有前导零
Solution
dp[i][j]表示第i位时有j个数发生进位时的最大值。
然后我们对有没有进位的情况进行分类讨论
Notice
每次做之前要radixsort一下
Code
#include<cmath>
#include<cstdio>
#include<cstring>
#include<iostream>
#include<algorithm>
using namespace std;
#define rank t
#define sqz main
#define ll long long
#define reg register int
#define rep(i, a, b) for (reg i = a; i <= b; i++)
#define per(i, a, b) for (reg i = a; i >= b; i--)
#define travel(i, u) for (reg i = head[u]; i; i = edge[i].next)
const int INF = 1e9, N = 1000;
const double eps = 1e-6, phi = acos(-1);
ll mod(ll a, ll b) {if (a >= b || a < 0) a %= b; if (a < 0) a += b; return a;}
ll read(){ ll x = 0; int zf = 1; char ch; while (ch != '-' && (ch < '0' || ch > '9')) ch = getchar();
if (ch == '-') zf = -1, ch = getchar(); while (ch >= '0' && ch <= '9') x = x * 10 + ch - '0', ch = getchar(); return x * zf;}
void write(ll y) { if (y < 0) putchar('-'), y = -y; if (y > 9) write(y / 10); putchar(y % 10 + '0');}
int rank[N + 5], S[N + 5][N + 5], now[N + 5], num[10], F[N + 5][N + 5], len[N + 5], V[10];
char st[N + 5][N + 5];
int m;
void radixsort(int pos)
{
memset(num, 0, sizeof num);
rep(i, 1, m) num[S[i][pos]]++;
per(i, 9, 1) num[i - 1] += num[i];
per(i, m, 1) now[num[S[rank[i]][pos]]--] = rank[i];
rep(i, 1, m) rank[i] = now[i];
}
int sqz()
{
scanf("%s", st[0] + 1);
int n = len[0] = strlen(st[0] + 1);
m = read();
rep(i, 1, m) scanf("%s", st[i] + 1), len[i] = strlen(st[i] + 1), n = max(n, len[i]);
n++;
rep(i, 0, m)
rep(j, 1, len[i])
S[i][j + n - len[i]] = (st[i][j] == '?' ? -1 : st[i][j] - '0');
rep(i, 0, 9) V[i] = read();
rep(i, 1, n)
rep(j, 0, m) F[i][j] = -INF;
int l = S[0][n] == -1 ? 0 : S[0][n], r = S[0][n] == -1 ? 9 : S[0][n];
rep(i, l, r)
{
int cnt = 0, total = 0;
rep(j, 1, m)
{
if (i + S[j][n] >= 10) cnt++;
total += V[(i + S[j][n]) % 10];
}
F[n][cnt] = max(F[n][cnt], total);
}
rep(i, 1, m) rank[i] = i;
rank[m + 1] = m + 1;
per(i, n - 1, 1)
{
radixsort(i + 1);
int l = S[0][i] == -1 ? 0 : S[0][i], r = S[0][i] == -1 ? 9 : S[0][i];
if (n - i + 1 == len[0] && l == 0) l++;
rep(num, l, r)
{
int cnt = 0, total = 0;
rep(j, 1, m)
{
if (max(len[j], len[0]) < n - i + 1) continue;
total += V[(S[j][i] + num) % 10];
cnt += S[j][i] + num >= 10;
}
rep(j, 1, m + 1)
{
F[i][cnt] = max(F[i][cnt], F[i + 1][j - 1] + total);
total += (max(len[rank[j]], len[0]) >= n - i + 1 || (S[rank[j]][i] + num + 1) ? V[(S[rank[j]][i] + num + 1) % 10] : 0) - (max(len[rank[j]], len[0]) >= n - i + 1 || (S[rank[j]][i] + num)? V[(S[rank[j]][i] + num) % 10] : 0);
cnt += S[rank[j]][i] + num + 1 == 10;
}
}
}
int ans = 0;
rep(i, 0, m) ans = max(ans, F[1][i]);
printf("%d\n", ans);
return 0;
}
