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In an integer array (size 10^5) the operations are like these...

  1. Do bitwise xor operation with every element from index L to R by a particular number X
  2. Find the sum of the numbers from index L to R.

How can i do it with segment tree and lazy propagation ?

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what have you tried/thought of? –  Sheena Nov 11 '12 at 17:21
I'll add a clue: XOR is associative. (A XOR X) XOR Y) has the same result as A XOR (X XOR Y). –  Patricia Shanahan Nov 11 '12 at 17:36
@Patricia Shanahan , thanks but i knew that. my problem is to find out the segment sum. –  palatok Nov 11 '12 at 17:50
Your problem is to find the segment sum of data that is also subject to XORs on segments. How would you solve the problem if you only had operation 2? –  Patricia Shanahan Nov 11 '12 at 18:18

2 Answers 2

up vote 1 down vote accepted

I'd keep, on each node, 32 integers telling me how many ones are there in each position of the binary representation of the child nodes.

To XOR a segment node, it's just a matter of inverting how many ones are there in each position (for each bit 1 in X).

for i in range(32):
    if X&(1<<i):
        N[i] = (R-L+1)-N[i]. 

To calculate the sum,

s = 0
for i in range(32):
    s |= ((N[i]+carry)%2) << i
    carry = (N[i]+carry)/2
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i don't understand this line... N[i] = (R-L+1)-N[i]. why would i subtract N[i] ? –  palatok Nov 13 '12 at 0:20
To invert the number of 1's in the segment. Suppose we have a segment from 3 to 7 with 2 ones. This means that xor'ing it with a bit 1 will invert this number, i.e., all the ones become zeroes and all the zeroes become one. 7-3+1 -2 = 5 -2 = 3 –  Juan Lopes Nov 13 '12 at 12:24

Your answer is not correct. You need to do some sort of lazy update like here: http://p--np.blogspot.ro/2011/07/segment-tree.html . Else, if you do update(1,n, x) and query(4,5) you will get a wrong answer because the update has changed just the root node.

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