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We are given P 2-D points (x1,y1),(x2,y2),(x3,y3),....(xP,yP).

There are total M number of Queries. Each query is in the form of a triplet.The format of each query is :

(a b d)

Let T be a triangle with vertices X(a+d,b),Y(a,b),Z(a,b+d)

For each of the M Queries, we have to return how many of the given points lie inside or on the boundary of triangle.

Example

P=5, M=3

The points(xi,yi) are :

1 3
1 5
3 6
4 4
2 6

The M Queries (format (a,b,d)) are:

1 5 3
1 5 4
1 1 1

Answer for above three queries are 3,3,0 respectively.

I tried to solve this problem using simple naive approach.But the constraints for the problem is indeed very large and are follows:

1 ≤ P ≤ 300000 1 ≤ M ≤ 200000
1 ≤ xi, yi ≤ 300000
1 ≤ a, b, d ≤ 300000

The Time Limit for this problem is just 1 Second.

How can i solve this problem within the given time-limit?

I tried the following:

#define MAX 300500
pair<int,int> p[MAX];
int n,q;
int x,y,d;
inline void scan(int *a)
{
    register char c=0;
    while (c<33) c=getchar_unlocked();
    *a=0;
    while (c>33)
    {
        *a=*a*10+c-'0';
        c=getchar_unlocked();
    }
}
void process()
{
    int count=0; 
    for(int i=0;i<n;i++)
    {     
        if((p[i].first>=x && p[i].first<= (x+d)) && (p[i].second>=y && p[i].second<= (y+d)) && (p[i].first + p[i].second - y -x -d)<=0)
            count++;     
    } 
    cout<<count<<endl;
}
int main()
{
#ifdef _MSC_VER
    freopen("input.txt","r",stdin);
#endif
    scan(&n);scan(&q);
    for(int i=0;i<n;i++)
    {
        scan(&p[i].first);scan(&p[i].second);    
    }
    for(int i=0;i<q;i++)
    {
        scan(&x);scan(&y);scan(&d);
        process();     
    }
    return 0;
}

My solution will surely time out (I realized it after calculating Complexity). Also, i also tried to think this problem in terms of K-D Trees, but practically , not able to map it.

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closed as too localized by Oliver Charlesworth, Alexey Frunze, H2CO3, Radu Murzea, EdChum Feb 9 '13 at 21:34

This question is unlikely to help any future visitors; it is only relevant to a small geographic area, a specific moment in time, or an extraordinarily narrow situation that is not generally applicable to the worldwide audience of the internet. For help making this question more broadly applicable, visit the help center. If this question can be reworded to fit the rules in the help center, please edit the question.

2  
What have you tried? –  Oliver Charlesworth Feb 9 '13 at 20:19
    
Why always stackoverflow closes every difficult problems by marking them homework? I expressed that , i had use a very naive approach, so initially,i thought its irrelevant to put something that is quite naive, so did n't put it in question. Basically , i need help in algorithm that can do the above job within the given Time Limits –  user1414550 Feb 9 '13 at 20:27
    
lolz, that's what stackoverflow modulator does,everytime. Whenever there is tougher and quite new question, they just closed it, marking it homework, localized,etc. Atleast if you close question,close it giving a valid reason,no one in this planet agrees (except stackoverflow mods), that this question is too localised.And plz , if you have high repultation and privileges to close question, don't waste it. –  user1414550 Feb 9 '13 at 21:39

1 Answer 1

This looks solvable with the triangular modification of quad tree.

So, first of all - study the Quad Tree (see link below). With the help of this data structure you can determine the amount of points within some square with O(logP) time, and with O(P*logP) preprocessing.

(assuming that you know what the quad tree is) Second of all - modify the Quad Tree structure. In this particular problem you need to determine the amount of points within the left-bottom triangle of some square. So you need to implement the "quad" tree with triangular structure element. The basic space for this tree is the left-bottom triangle, which can be divided into three smaller left-bottom triangles and one right-top triangle. So, we should implement two quad trees: for left-bottom triangles and for right-top triangles, and build them together.

link below: http://en.wikipedia.org/wiki/Quadtree

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