题目链接: P3413 SAC#1 - 萌数
题目大意
详见题目
solution
有个弱化版:P6754 [BalticOI 2013 Day1] Palindrome-Free Numb
正着想, 好想么? 不好想. 那我们正难则反的来考虑
然后对于 (ans_{l, r}) 可以转化为 (ans_{1, r} - ans_{1, l - 1})
设 (f_{i, j, k}) 表示长度为 (i) 最高位为 (j) 的次高位为 (k) 的非萌数的个数
(f_{i, j, k} += sumlimits_{ ext{k != j && k != l && j != l}} f_{i - 1, k, l})
对于(ans_{1, r}) 我们简单的进行讨论即可
小问题 :
- 注意前导零的问题
- 因为 (l) 位数太大 我们无法简单的对 (l - 1) 进行求解, 所以我们直接对 (l) 单独处理即可
那么答案就是 (ans_{l, r} + ans_l)
Code:
/**
* Author: Aliemo
* Data:
* Problem:
* Time: O()
*/
#include <cstdio>
#include <iostream>
#include <string>
#include <cstring>
#include <cmath>
#include <algorithm>
#define int long long
#define rr register
#define inf 1e9
#define MAXN 2010
using namespace std;
const int mod = 1e9 + 7;
inline int read() {
int s = 0, f = 0;
char ch = getchar();
while (!isdigit(ch)) f |= ch == '-', ch = getchar();
while (isdigit(ch)) s = s * 10 + (ch ^ 48), ch = getchar();
return f ? -s : s;
}
void print(int x) {
if (x < 0) putchar('-'), x = -x;
if (x > 9) print(x / 10);
putchar(x % 10 + 48);
}
char l[MAXN], r[MAXN];
int f[MAXN][20][20], a[MAXN];
int len, tot, ans;
inline int f_pow(int x, int y) {
int ans = 1;
while (y) {
if (y & 1) ans = ans * x % mod;
x = x * x % mod;
y >>= 1;
}
return ans % mod;
}
inline void init() {
for (rr int i = 2; i <= 1000; i++)
for (rr int j = 0; j <= 9; j++)
for (rr int k = 0; k <= 9; k++) {
if (j == k) continue;
for (rr int l = 0; l <= 9; l++)
if (k != l && j != l)
f[i][j][k] = (f[i - 1][k][l] + f[i][j][k]) % mod;
if (i == 2) f[i][j][k]++;
f[i][j][k] %= mod;
}
}
inline int solve(char s[]) {
memset(a, 0, sizeof a);
tot = 0;
int len = strlen(s);
if (len == 1) return 0;
bool t = 1;
int res = 0, last1 = -1, last2 = -1, sum = 0;
for (rr int i = len; i >= 1; i--) {
a[i] = s[len - i] - '0';
sum = (sum * 10 + a[i]) % mod;
}
sum++;
res += 10;
for (rr int i = 2; i < len; i++) //前导零
for (rr int j = 1; j <= 9; j++)
for (rr int k = 0; k <= 9; k++)
res = (res + f[i][j][k]) % mod;
for (rr int i = len; i >= 2; i--) {
int x = a[i];
for (rr int j = 0; j < x; j++) {
if (i == len && !j) continue;
for (rr int k = 0; k <= 9; k++)
if (last1 != j && last2 != j && j != k && last1 != k)
res = (res + f[i][j][k]) % mod;
}
if (last1 == x || last2 == x) {
t = 0;
break;
}
last2 = last1, last1 = x;
}
if (t)
for (rr int i = 0; i <= a[1]; i++)
if (i != last2 && i != last1)
res = (res + 1) % mod;
return (sum - res + mod) % mod;
}
signed main() {
init();
cin >> l >> r;
ans = (solve(r) - solve(l) + mod) % mod;
int t = strlen(l);
for (rr int i = 1; i < t; i++)
if (l[i] == l[i - 1] || (l[i] == l[i - 2] && i > 1)) {
ans = (ans + 1) % mod;
break;
}
cout << ans << "
";
}