I'm solving a problem which needs to be solved using a heap data structure. Although the operations will be dominated by insert and extract-min, there will be instances when I'll need to replace an item's key (increase or decrease) or delete the item, key altogether. Since the `heapq`

module doesnt provide these operations and searching for a item in the heap would be `O(n)`

, it would be smarter to just use a dict for bookkeeping and then just use it for finding the position of the item, delete or replace it and call `heapify`

to restore heap property - all of these operations in totality will run in `O(logn)`

.
The problem is that I'm unable to implement such a dict, though.

```
h, bkp = [], {}
heappush(h, (5, 'a'))
bkp['a'] = # index of 'a' in heap
heappush(h, (7, 'b'))
bkp['b'] = # index of 'b' in heap
heappush(h, (1, 'c'))
bkp['c'] = # index of 'c' in heap
# deleting 'a'
h[bkp['a']], h[-1] = h[-1], h[bkp['a']]
h.pop()
heapify(h)
#update indices in bkp
```

Question - How do I find the index of the newly inserted in the heap and after a delete or push operation, how do I recompute indices for existing items in the heap?

`heapq`

documentation? – delnan Dec 11 '12 at 14:53