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segment tree CodeForces Segment Trees, Part 2, 1.2
Problem statement
https://codeforces.com/edu/course/2/lesson/5/1/practice/contest/279634/problem/B
Solution
This segment tree will support two operations:
- For all elements in range
[r, l)applyai = max(ai, v) - Find element at index
i.
Complexity
Standart compexities for segment tree.
Code
class SegmentTree:
def __init__(self, n, arr):
self.size = 1
while self.size < n:
self.size *= 2
self.T = [0] * (2 * self.size - 1)
self.arr = arr
def _modify(self, l, r, v, x, lx, rx):
if l >= rx or lx >= r:
return
if lx >= l and rx <= r:
self.T[x] = max(self.T[x], v)
return
mx = (lx + rx)//2
self._modify(l, r, v, 2*x+1, lx, mx)
self._modify(l, r, v, 2*x+2, mx, rx)
def modify(self, l, r, v):
return self._modify(l, r, v, 0, 0, self.size)
def _get(self, i, x, lx, rx):
if rx - lx == 1:
return self.T[x]
mx = (lx + rx) // 2
if i < mx:
return max(self._get(i, 2 * x + 1, lx, mx), self.T[x])
else:
return max(self._get(i, 2 * x + 2, mx, rx), self.T[x])
def get(self, i):
return self._get(i, 0, 0, self.size)
if __name__ == '__main__':
n, m = [int(i) for i in input().split()]
STree = SegmentTree(n, [0]*n)
for i in range(m):
t = [int(i) for i in input().split()]
if t[0] == 1:
STree.modify(t[1], t[2], t[3])
else:
print(STree.get(t[1]))