Does anyone know if there is a clean implementation of the Turlach rolling median algorithm in C? I'm having trouble porting the R version to a clean C version. See here for more details on the algorithm.

EDIT: As darkcminor pointed out, matlab has a function medfilt2 which calls ordf which is a c implementation of a rolling order statistic algorithm. I believe the algorithm is faster than O(n^2), but it is not open source and I do not want to purchase the image processing toolbox.


I've implemented a rolling median calculator in C here (Gist). It uses a max-median-min heap structure: The median is at heap[0] (which is at the center of a K-item array). There is a minheap starting at heap[ 1], and a maxheap (using negative indexing) at heap[-1].
It's not exactly the same as the Turlach implementation from the R source: This one supports values being inserted on-the-fly, while the R version acts on a whole buffer at once. But I believe the time complexity is the same. And it could easily be used to implement a whole buffer version (possibly with with the addition of some code to handle R's "endrules").


//Customize for your data Item type
typedef int Item;
#define ItemLess(a,b)  ((a)<(b))
#define ItemMean(a,b)  (((a)+(b))/2)

typedef struct Mediator_t Mediator;

//creates new Mediator: to calculate `nItems` running median. 
//mallocs single block of memory, caller must free.
Mediator* MediatorNew(int nItems);

//returns median item (or average of 2 when item count is even)
Item MediatorMedian(Mediator* m);

//Inserts item, maintains median in O(lg nItems)
void MediatorInsert(Mediator* m, Item v)
   int isNew = (m->ct < m->N);
   int p = m->pos[m->idx];
   Item old = m->data[m->idx];
   m->data[m->idx] = v;
   m->idx = (m->idx+1) % m->N;
   m->ct += isNew;
   if (p > 0)         //new item is in minHeap
   {  if (!isNew && ItemLess(old, v)) { minSortDown(m, p*2);  }
      else if (minSortUp(m, p)) { maxSortDown(m,-1); }
   else if (p < 0)   //new item is in maxheap
   {  if (!isNew && ItemLess(v, old)) { maxSortDown(m, p*2); }
      else if (maxSortUp(m, p)) { minSortDown(m, 1); }
   else            //new item is at median
   {  if (maxCt(m)) { maxSortDown(m,-1); }
      if (minCt(m)) { minSortDown(m, 1); }
  • 1
    I can confirm this works and it is fast. It would be nice to have the ability to pop elements w/o inserting (to accomodate missing values) and to specify an arbitrary percentile. These are probably easy tweaks though. Good work!
    – Rich C
    May 15 '11 at 18:14
  • Implementing PopOldest() would be easy: The position of the oldest item in the heap is p=pos[(idx-ct+N)%N]. If it is in the minheap, swap it to the end, then do a sortdown to ensure the swapped item is in the right place: if (p>0) {exchange(p,minCt); m->ct--; minSortDown(p*2);. Otherwise do the same with the maxheap - except to handle the special case of p==0, you need to do a maxSortDown( p*2||-1).
    – AShelly
    May 16 '11 at 6:57
  • Implementing for "KthPercentile" would be a bit trickier but not too bad. For a K between 0.0 and 1.0, heap would point at element KN. maxCt would be ctk, minCt would be ct-1-maxCt. The tricky part would be initializing the pos array so that the initial elements are distributed correctly. It would be something like: for each i: point pos[i] to the next element on the maxheap until it contains more than K percent of the items so far, then shift to the minheap.
    – AShelly
    May 16 '11 at 7:43
  • 1
    Here are some benchmarks: github.com/suomela/median-filter — in brief, this approach seems to work very well in general, but for some data distributions it is possible to do better with a sorting-based algorithm. Apr 21 '14 at 11:24
  • 1
    Heads up for anybody interested, this code can also be found in movstat/medacc.c of the GNU Scientific Library (GSL; gnu.org/software/gsl) and is accessible via the gsl_movstat_median() interface. Jul 5 '19 at 15:57

OpenCV has a medianBlur function that seems to do what you want. I know it's a rolling median. I can't say if it's the "Turlach rolling median" specifically. It's pretty fast though and it supports multi-threading when available.

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