Given a sequence of data (it may have duplicates), a fixed-sized moving window, move the window at each iteration from the start of the data sequence, such that (1) the oldest data element is removed from the window and a new data element is pushed into the window (2) find the median of the data inside the window at each moving.
Here window size is 7, lets call it m. m = window size n = number of elements in sequence, it may be 1000 or 10000
Median for 4, 6, 99, 10, 90, 12, 17,1,21,32 : 12
Median for 6, 99, 10, 90, 12, 17, 1,21,32 : 12
Median for 99, 10, 90, 12, 17, 1, 21,32 : 17
Median for 10, 90, 12, 17, 1, 21, 32 : 17
I implemented this thing with help of Quicksort of m elements each time, (median of three as pivot). But this takes a lot of time. Every time sorting is require. I supposed to implement min and max heap solution as mentioned here
Problem in Min-Max heap solution :
When a new data is pushed in to the window, remove the oldest data from one of the heap and compare the new data with the top of max and min heap so that to decide which heap the data to be put. Then, find the median just like in the first iteration.
How to find remove the oldest data from heap, how can we maintain this. As per given example at second time 4 is oldest element, third time 6 is oldest element. How can we remove it from heap.
Followup question of above question, how to find a data element in a heap is a problem. Heap is a binary tree not a binary search tree.
Any help would be appreciated.
EDIT : I already have input data, So no insertion happening.Only happening to fixed size queue or window not for actual input sequence.
Thanks