Python/data_structures/heap/min_heap.py

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# Min head data structure
# with decrease key functionality - in O(log(n)) time
class Node:
def __init__(self, name, val):
self.name = name
self.val = val
def __str__(self):
return f"{self.__class__.__name__}({self.name}, {self.val})"
def __lt__(self, other):
return self.val < other.val
class MinHeap:
"""
>>> r = Node("R", -1)
>>> b = Node("B", 6)
>>> a = Node("A", 3)
>>> x = Node("X", 1)
>>> e = Node("E", 4)
>>> print(b)
Node(B, 6)
>>> myMinHeap = MinHeap([r, b, a, x, e])
>>> myMinHeap.decrease_key(b, -17)
>>> print(b)
Node(B, -17)
>>> print(myMinHeap["B"])
-17
"""
def __init__(self, array):
self.idx_of_element = {}
self.heap_dict = {}
self.heap = self.build_heap(array)
def __getitem__(self, key):
return self.get_value(key)
def get_parent_idx(self, idx):
return (idx - 1) // 2
def get_left_child_idx(self, idx):
return idx * 2 + 1
def get_right_child_idx(self, idx):
return idx * 2 + 2
def get_value(self, key):
return self.heap_dict[key]
def build_heap(self, array):
lastIdx = len(array) - 1
startFrom = self.get_parent_idx(lastIdx)
for idx, i in enumerate(array):
self.idx_of_element[i] = idx
self.heap_dict[i.name] = i.val
for i in range(startFrom, -1, -1):
self.sift_down(i, array)
return array
# this is min-heapify method
def sift_down(self, idx, array):
while True:
l = self.get_left_child_idx(idx) # noqa: E741
r = self.get_right_child_idx(idx)
smallest = idx
if l < len(array) and array[l] < array[idx]:
smallest = l
if r < len(array) and array[r] < array[smallest]:
smallest = r
if smallest != idx:
array[idx], array[smallest] = array[smallest], array[idx]
(
self.idx_of_element[array[idx]],
self.idx_of_element[array[smallest]],
) = (
self.idx_of_element[array[smallest]],
self.idx_of_element[array[idx]],
)
idx = smallest
else:
break
def sift_up(self, idx):
p = self.get_parent_idx(idx)
while p >= 0 and self.heap[p] > self.heap[idx]:
self.heap[p], self.heap[idx] = self.heap[idx], self.heap[p]
self.idx_of_element[self.heap[p]], self.idx_of_element[self.heap[idx]] = (
self.idx_of_element[self.heap[idx]],
self.idx_of_element[self.heap[p]],
)
idx = p
p = self.get_parent_idx(idx)
def peek(self):
return self.heap[0]
def remove(self):
self.heap[0], self.heap[-1] = self.heap[-1], self.heap[0]
self.idx_of_element[self.heap[0]], self.idx_of_element[self.heap[-1]] = (
self.idx_of_element[self.heap[-1]],
self.idx_of_element[self.heap[0]],
)
x = self.heap.pop()
del self.idx_of_element[x]
self.sift_down(0, self.heap)
return x
def insert(self, node):
self.heap.append(node)
self.idx_of_element[node] = len(self.heap) - 1
self.heap_dict[node.name] = node.val
self.sift_up(len(self.heap) - 1)
def is_empty(self):
return True if len(self.heap) == 0 else False
def decrease_key(self, node, newValue):
assert (
self.heap[self.idx_of_element[node]].val > newValue
), "newValue must be less that current value"
node.val = newValue
self.heap_dict[node.name] = newValue
self.sift_up(self.idx_of_element[node])
# USAGE
r = Node("R", -1)
b = Node("B", 6)
a = Node("A", 3)
x = Node("X", 1)
e = Node("E", 4)
# Use one of these two ways to generate Min-Heap
# Generating Min-Heap from array
myMinHeap = MinHeap([r, b, a, x, e])
# Generating Min-Heap by Insert method
# myMinHeap.insert(a)
# myMinHeap.insert(b)
# myMinHeap.insert(x)
# myMinHeap.insert(r)
# myMinHeap.insert(e)
# Before
print("Min Heap - before decrease key")
for i in myMinHeap.heap:
print(i)
print("Min Heap - After decrease key of node [B -> -17]")
myMinHeap.decrease_key(b, -17)
# After
for i in myMinHeap.heap:
print(i)
if __name__ == "__main__":
import doctest
doctest.testmod()