zoukankan      html  css  js  c++  java
  • 杭电多校第二场 hdu 6315 Naive Operations 线段树变形

    Naive Operations

    Time Limit: 6000/3000 MS (Java/Others)    Memory Limit: 502768/502768 K (Java/Others)
    Total Submission(s): 2114    Accepted Submission(s): 915


    Problem Description
    In a galaxy far, far away, there are two integer sequence a and b of length n.
    b is a static permutation of 1 to n. Initially a is filled with zeroes.
    There are two kind of operations:
    1. add l r: add one for al,al+1...ar
    2. query l r: query ri=lai/bi
     
    Input
    There are multiple test cases, please read till the end of input file.
    For each test case, in the first line, two integers n,q, representing the length of a,b and the number of queries.
    In the second line, n integers separated by spaces, representing permutation b.
    In the following q lines, each line is either in the form 'add l r' or 'query l r', representing an operation.
    1n,q1000001lrn, there're no more than 5 test cases.
     
    Output
    Output the answer for each 'query', each one line.
     
    Sample Input
    5 12 1 5 2 4 3 add 1 4 query 1 4 add 2 5 query 2 5 add 3 5 query 1 5 add 2 4 query 1 4 add 2 5 query 2 5 add 2 2 query 1 5
     
    Sample Output
    1 1 2 4 4 6
     
    Source
     
    Recommend
    chendu   |   We have carefully selected several similar problems for you:  6318 6317 6316 6315 6314 
     
    题意:有个初始值为0的数组a,和一个数组b,每次可以对a数组所有数进行一次加一的操作,问每次查询时 a(l)/b(l) + a(l+1)/b(l+1) + ... + a(r)/b(r) 的和
    分析:考虑我们要求的是[a1/b1] + [a2/b2] + ... + [an/bn]的和,看单独的项a1/b1,因为a1是从零开始的,所以只有当我们加的次数等于b1时(每次只加一),整体的和才会加一
    a1每次加一一直加到b1相当于b1每次减一一直减到0(当bi的值减到一再重新赋值为bi这样可以一直进行加减操作),因为bi最开始的值是大于0的,所以我只需要用一个线段树来维护每次的最小值和区间和就行
    #include <map>
    #include <set>
    #include <stack>
    #include <cmath>
    #include <queue>
    #include <cstdio>
    #include <vector>
    #include <string>
    #include <cstring>
    #include <iomanip>
    #include <iostream>
    #include <algorithm>
    #define ls (r<<1)
    #define rs (r<<1|1)
    #define debug(a) cout << #a << " " << a << endl
    using namespace std;
    typedef long long ll;
    const ll maxn = 1e5 + 1000;
    const ll mod = 1e9 + 7;
    struct node {
        ll fg;
        ll s;   //一段区间总和
        ll mv;  //记录最小值
    }root[4*maxn];
    ll b[maxn], n, m, le, ri;
    char s[10];
    void update( ll r ) {
        root[r].mv = min( root[ls].mv, root[rs].mv );
        root[r].s = root[ls].s + root[rs].s;
    }
    void setf( ll r, ll f ) {
        root[r].fg += f;
        root[r].mv += f;
    }
    void build( ll r, ll le, ll ri ) {
        root[r].fg = 0;
        if( le == ri ) {
            root[r].mv = b[le]-1;
            root[r].s = 0;
        } else {
            ll mid = ( le + ri ) >> 1;
            build( ls, le, mid );
            build( rs, mid+1, ri );
            update(r);
        }
    }
    void push( ll r ) {
        if( root[r].fg ) { //fg为-1进行操作,将左右子树最小值置为-1,同时将左右子树fg标记为-1
            setf( ls, root[r].fg );
            setf( rs, root[r].fg );
            root[r].fg = 0;
        }
    }
    ll query( ll r, ll le, ll ri, ll tl, ll tr ) {
        if( tl == le && tr == ri ) {
            return root[r].s;
        } else {
            push(r);
            ll mid = ( le + ri ) >> 1;
            if( tr <= mid ) {
                return query( ls, le, mid, tl, tr );
            } else if( tl > mid ) {
                return query( rs, mid+1, ri, tl, tr );
            } else {
                return query( ls, le, mid, tl, mid ) + query( rs, mid+1, ri, mid+1, tr );
            }
        }
    }
    void modify( ll r, ll le, ll ri, ll tl, ll tr ) {
        if( tl > tr ) {
            return;
        }
        if( tl == le && tr == ri ) {
            if( root[r].mv > 0 ) {
                root[r].mv --, root[r].fg --;
            } else {
                if( tl == tr ) {
                    root[r].mv = b[le]-1;
                    root[r].s ++;
                } else {
                    push(r);
                    ll mid = ( le + ri ) >> 1;
                    if( root[ls].mv == 0 ) {
                        modify( ls, le, mid, tl, mid );
                    } else {
                        setf( ls, -1 );
                    }
                    if( root[rs].mv == 0 ) {
                        modify( rs, mid+1, ri, mid+1, tr );
                    } else {
                        setf( rs, -1 );
                    }
                    update(r);
                }
            }
        } else {
            push(r);
            ll mid = ( le + ri ) >> 1;
            if( tr <= mid ) {
                modify( ls, le, mid, tl, tr );
            } else if( tl > mid ) {
                modify( rs, mid+1, ri, tl, tr );
            } else {
                modify( ls, le, mid, tl, mid ), modify( rs, mid+1, ri, mid+1, tr );
            }
            update(r);
        }
    }
    int main() {
        ios::sync_with_stdio(0),cin.tie(0),cout.tie(0);
        while( scanf("%lld%lld",&n,&m) != EOF ) {
            for( ll i = 1; i <= n; i ++ ) {
                scanf("%lld",&b[i]);
            }
            build(1,1,n);
            for( ll i = 1; i <= m; i ++ ) {
                scanf("%s%lld%lld",s,&le,&ri);
                if( s[0] == 'a' ) {
                    modify( 1, 1, n, le, ri );
                } else {
                    printf("%lld
    ",query(1,1,n,le,ri));
                }
            }
        }
        return 0;
    }
    

      

    彼时当年少,莫负好时光。
  • 相关阅读:
    POJ 2991 Crane(线段树)
    HDU 1754 I Hate It(线段树)
    HDU 1754 I Hate It(线段树)
    HDU 1166 敌兵布阵 (线段树模版题)
    HDU 1166 敌兵布阵 (线段树模版题)
    Tree Recovery
    Tree Recovery
    情人节的电灯泡(二维树状数组)
    情人节的电灯泡(二维树状数组)
    【LeetCode】Validate Binary Search Tree 二叉查找树的推断
  • 原文地址:https://www.cnblogs.com/l609929321/p/9378830.html
Copyright © 2011-2022 走看看