数据结构优化 \(dp\) 的题目都很套路
设 \(f[i]\) 表示取到 \(i\) 且 \(i\) 必取的最大长度
那么显然:
\[ f(i)=\max\limits_{j=1}^i(f(j))+1 (|h_i-h_j| \ge d) \]
直接枚举 \(O(n^2)\) 考虑优化
拆去绝对值后发现其实就是 \(h_j \le h_i-d\) 或 \(h_j \ge h_i+d\)。相当于对两个区间查询最大值
对 \(h\) 进行离散化后可以二分位置,之后就可以用数据结构优化了
可以是一个线段树或两颗树状数组,我选择后者
时间复杂度 \(O(n~log~n)\)
#include <map>
#include <set>
#include <ctime>
#include <queue>
#include <stack>
#include <cmath>
#include <vector>
#include <bitset>
#include <cstdio>
#include <cctype>
#include <string>
#include <numeric>
#include <cstring>
#include <cassert>
#include <climits>
#include <cstdlib>
#include <iostream>
#include <algorithm>
#include <functional>
using namespace std ;
#define int long long
#define rep(i, a, b) for (int i = (a); i <= (b); i++)
#define per(i, a, b) for (int i = (a); i >= (b); i--)
#define loop(s, v, it) for (s::iterator it = v.begin(); it != v.end(); it++)
#define cont(i, x) for (int i = head[x]; i; i = e[i].nxt)
#define clr(a) memset(a, 0, sizeof(a))
#define ass(a, sum) memset(a, sum, sizeof(a))
#define lowbit(x) (x & -x)
#define all(x) x.begin(), x.end()
#define ub upper_bound
#define lb lower_bound
#define pq priority_queue
#define mp make_pair
#define pb push_back
#define fi first
#define se second
#define iv inline void
#define enter cout << endl
#define siz(x) ((int)x.size())
#define file(x) freopen(#x".in", "r", stdin),freopen(#x".out", "w", stdout)
typedef long long ll ;
typedef unsigned long long ull ;
typedef pair <int, int> pii ;
typedef vector <int> vi ;
typedef vector <pii> vii ;
typedef queue <int> qi ;
typedef queue <pii> qii ;
typedef set <int> si ;
typedef map <int, int> mii ;
typedef map <string, int> msi ;
const int N = 100010 ;
const int INF = 0x3f3f3f3f ;
const int iinf = 1 << 30 ;
const ll linf = 2e18 ;
const int MOD = 1000000007 ;
const double eps = 1e-7 ;
void print(int x) { cout << x << endl ; exit(0) ; }
void PRINT(string x) { cout << x << endl ; exit(0) ; }
void douout(double x){ printf("%lf\n", x + 0.0000000001) ; }
int n, d, tt ;
int tmp[N], a[N], bit1[N], bit2[N], ans[N], to[N] ;
void lsh() {
rep(i, 1, n) tmp[i] = a[i] ;
sort(tmp + 1, tmp + n + 1) ;
tt = unique(tmp + 1, tmp + n + 1) - (tmp + 1) ;
}
int Max(int a, int b) {
return ans[a] < ans[b] ? b : a ;
}
void add1(int x, int y) {
for (; x <= tt; x += lowbit(x)) bit1[x] = Max(bit1[x], y) ;
}
int ask1(int x) {
int ans = 0 ;
for (; x; x -= lowbit(x)) ans = Max(bit1[x], ans) ;
return ans ;
}
void add2(int x, int y) {
for (; x <= tt; x += lowbit(x)) bit2[x] = Max(bit2[x], y) ;
}
int ask2(int x) {
int ans = 0 ;
for (; x; x -= lowbit(x)) ans = Max(bit2[x], ans) ;
return ans ;
}
signed main(){
scanf("%lld%lld", &n, &d) ;
rep(i, 1, n) scanf("%lld", &a[i]) ;
lsh() ;
per(i, n, 1) {
int x = lb(tmp + 1, tmp + tt + 1, a[i] + d) - tmp ;
int y = ub(tmp + 1, tmp + tt + 1, a[i] - d) - (tmp + 1) ;
int res = Max(ask1(y), ask2(tt - x + 1)) ;
ans[i] = ans[res] + 1 ;
to[i] = res ;
int pos = lb(tmp + 1, tmp + tt + 1, a[i]) - tmp ;
add1(pos, i) ;
add2(tt - pos + 1, i) ;
}
// rep(i, 1, n) cout << ans[i] << " " ; enter ;
int s = 0 ;
rep(i, 1, n) s = Max(s, i) ;
printf("%lld\n", ans[s]) ;
while (s) {
printf("%lld ", s) ;
s = to[s] ;
}
enter ;
return 0 ;
}
/*
写代码时请注意:
1.ll?数组大小,边界?数据范围?
2.精度?
3.特判?
4.至少做一些
思考提醒:
1.最大值最小->二分?
2.可以贪心么?不行dp可以么
3.可以优化么
4.维护区间用什么数据结构?
5.统计方案是用dp?模了么?
6.逆向思维?
*/