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I am quite new to segment tree and would like to make myself busy by doing some more exercise on segment tree.

The problem's actually more ACM like and have following conditions: There are n numbers and m operations, n,m<=10,000, each operation can be one of the following: 1. Update an interval by minus a number x, x can be different each time 2. Query an interval to find how many numbers in the interval is <= 0

Building the segment tree and updating here is obviously can be done in O(nlog n) / O(log n) But I cannot figure out how to make a query in O(log n), can anyone give me some suggestions / hints? Any suggestions would be helpful! Thanks!

TL;DR:

Given n numbers, and 2 type operations:

  1. add x to all elements in [a,b], x can be different each time
  2. Query number of elements in [a,b] is < C, C is given constant

How to make operation 1 & 2 both can be done in O(log n)?

share|improve this question
    
Where does this problem come from? Is it homework? –  Codie CodeMonkey Sep 14 '13 at 10:06
    
Have a look at my answer at stackoverflow.com/questions/18687589 –  Peter de Rivaz Sep 14 '13 at 12:13
    
Codie: No..actually I never learnt segment tree in my undergraduate courses, I only learnt it from my ACM team training back then. So yes, I am working now so it is not my homework. Peter: Really thanks and sorry that I could not find this post before..It really helps, as usual the main point is the design of the tree node... I miss the "Smallest positive value of all child nodes" part and thus I cannot fully use lazy propagation...Thanks again! –  shole Sep 14 '13 at 15:32
    
This question appears to be off-topic because it is about CS and belongs on CS.SE –  Saeed Amiri Sep 15 '13 at 0:57

2 Answers 2

Nice Problem:)

I think for a while but still can't work out this problem with segment tree, but I've tried using "Bucket Method" to solve this problem.

We can divide the initial n numbers into B buckets, sort the number in each buckets and maintain the total add val in each bucket. Then for each query:

  • "Add" update interval [a, b] with c

    we only need to rebuild at most two buckets and add c to (b - a) / BUCKET_SIZE buckets

  • "Query" query interval [a, b] <= c

    we only need to scan at most two buckets with each value one by one and quick go through (b-a) / BUCKET_SIZE buckets with binary search quickly

It should be run in O( N/BUCKET_SIZE * log(BUCKET_SIZE, 2)) for each query, which is smaller than bruteforce method( O(N)). Though it's bigger than O(logN), it may be sufficient in most cases.

Here are the test code:

#include <iostream>
#include <cstdio>
#include <cstdlib>
#include <string>
#include <cstring>
#include <cmath>
#include <algorithm>
#include <vector>
#include <set>
#include <map>
#include <ctime>
#include <cassert>

using namespace std;

struct Query {
    //A a b c  add c in [a, b] of arr
    //Q a b c  Query number of i in [a, b] which arr[i] <= c
    char ty;
    int a, b, c;
    Query(char _ty, int _a, int _b, int _c):ty(_ty), a(_a), b(_b), c(_c){}
};

int n, m;
vector<int> arr;
vector<Query> queries;

vector<int> bruteforce() {
    vector<int> ret;
    vector<int> numbers = arr;
    for (int i = 0; i < m; i++) {
        Query q = queries[i];
        if (q.ty == 'A') {
            for (int i = q.a; i <= q.b; i++) {
                numbers[i] += q.c;
            }
            ret.push_back(-1);
        } else {
            int tmp = 0;
            for(int i = q.a; i <= q.b; i++) {
                tmp += numbers[i] <= q.c;
            }
            ret.push_back(tmp);
        }
    }
    return ret;
}

struct Bucket {
    vector<int> numbers;
    vector<int> numbers_sorted;
    int add;
    Bucket() {
        add = 0;
        numbers_sorted.clear();
        numbers.clear();
    }
    int query(int pos) {
        return numbers[pos] + add;
    }
    void add_pos(int pos, int val) {
        numbers[pos] += val;
    }
    void build() {
        numbers_sorted = numbers;
        sort(numbers_sorted.begin(), numbers_sorted.end());
    }
};

vector<int> bucket_count(int bucket_size) {
    vector<int> ret;

    vector<Bucket> buckets;
    buckets.resize(int(n / bucket_size) + 5);
    for (int i = 0; i < n; i++) {
        buckets[i / bucket_size].numbers.push_back(arr[i]);
    }

    for (int i = 0; i <= n / bucket_size; i++) {
        buckets[i].build();
    }

    for (int i = 0; i < m; i++) {
        Query q = queries[i];
        char ty = q.ty;
        int a, b, c;
        a = q.a, b = q.b, c = q.c;
        if (ty == 'A') {
            set<int> affect_buckets;
            while (a < b && a % bucket_size != 0) buckets[a/ bucket_size].add_pos(a % bucket_size, c), affect_buckets.insert(a/bucket_size), a++;
            while (a < b && b % bucket_size != 0) buckets[b/ bucket_size].add_pos(b % bucket_size, c), affect_buckets.insert(b/bucket_size), b--;
            while (a < b) {
                buckets[a/bucket_size].add += c;
                a += bucket_size;
            }
            buckets[a/bucket_size].add_pos(a % bucket_size, c), affect_buckets.insert(a / bucket_size);
            for (set<int>::iterator it = affect_buckets.begin(); it != affect_buckets.end(); it++) {
                int id = *it;
                buckets[id].build();
            }
            ret.push_back(-1);
        } else {
            int tmp = 0;
            while (a < b && a % bucket_size != 0) tmp += (buckets[a/ bucket_size].query(a % bucket_size) <=c), a++;
            while (a < b && b % bucket_size != 0) tmp += (buckets[b/ bucket_size].query(b % bucket_size) <=c), b--;
            while (a < b) {
                int pos = a / bucket_size;
                tmp += upper_bound(buckets[pos].numbers_sorted.begin(), buckets[pos].numbers_sorted.end(), c - buckets[pos].add) - buckets[pos].numbers_sorted.begin();
                a += bucket_size;
            }
            tmp += (buckets[a / bucket_size].query(a % bucket_size) <= c);
            ret.push_back(tmp);
        }
    }

    return ret;
}

void process(int cas) {

    clock_t begin_t=clock();

    vector<int> bf_ans = bruteforce();
    clock_t  bf_end_t =clock();
    double bf_sec = ((1.0 * bf_end_t - begin_t)) / CLOCKS_PER_SEC;

    //bucket_size is important
    int bucket_size = 200;
    vector<int> ans = bucket_count(bucket_size);

    clock_t  bucket_end_t =clock();
    double bucket_sec = ((1.0 * bucket_end_t - bf_end_t)) / CLOCKS_PER_SEC;

    bool correct = true;
    for (int i = 0; i < ans.size(); i++) {
        if (ans[i] != bf_ans[i]) {
            cout << "query " << i + 1 << " bf = " << bf_ans[i] << " bucket  = " << ans[i] << "  bucket size = " <<  bucket_size << " " << n << " " << m <<  endl;
            correct = false;
        }
    }
    printf("Case #%d:%s bf_sec = %.9lf, bucket_sec = %.9lf\n", cas, correct ? "YES":"NO", bf_sec, bucket_sec);
}

void read() {
    cin >> n >> m;
    arr.clear();
    for (int i = 0; i < n; i++) {
        int val;
        cin >> val;
        arr.push_back(val);
    }
    queries.clear();
    for (int i = 0; i < m; i++) {
        char ty;
        int a, b, c;
        // a, b, c in [0, n - 1], a <= b
        cin >> ty >> a >> b >> c;
        queries.push_back(Query(ty, a, b, c));
    }
}

void run(int cas) {
    read();
    process(cas);
}

int main() {
    freopen("bucket.in", "r", stdin);
    //freopen("bucket.out", "w", stdout);
    int T;
    scanf("%d", &T);
    for (int cas  = 1; cas <= T; cas++) {
        run(cas);
    }
    return 0;
}

and here are the data gen code:

#coding=utf8

import random
import math

def gen_buckets(f):
    t = random.randint(10, 20)
    print >> f, t
    nlimit = 100000
    mlimit = 10000
    limit = 100000
    for i in xrange(t):
        n = random.randint(1, nlimit)
        m = random.randint(1, mlimit)
        print >> f, n, m

        for i in xrange(n):
            val = random.randint(1, limit)
            print >> f, val ,
        print >> f
        for i in xrange(m):
            ty = random.randint(1, 2)
            a = random.randint(0, n - 1)
            b = random.randint(a, n - 1)
            #a = 0
            #b = n - 1
            c = random.randint(-limit, limit)
            print >> f, 'A' if ty == 1 else 'Q', a, b, c


f = open("bucket.in", "w")
gen_buckets(f)
share|improve this answer

Try applying a Binary Index Trees (BIT) instead of a segmented tree. Here's the link to the tutorial

share|improve this answer
    
Thanks for your help Dennis. Actually when I was designing the algorithm to solve the problem BIT is my first attempt, but for some reasons I know that BIT is not able to solve this problem in O(nlogn), only segment tree can do the job... –  shole Sep 15 '13 at 8:31

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