Yes there is. Google failed to find it because it's more commonly known as "sequential k-means".
You can find two pseudo-code implementations of sequential K-means in this section of some Princeton CS class notes by Richard Duda. I've reproduced one of the two implementations below:
Make initial guesses for the means m1, m2, ..., mk
Set the counts n1, n2, ..., nk to zero
Acquire the next example, x
If mi is closest to x
Replace mi by mi + (1/ni)*( x - mi)
The beautiful thing about it is that you only need to remember the mean of each cluster and the count of the number of data points assigned to the cluster. Once you update those two variables, you can throw away the data point.
I'm not sure where you would be able to find a citation for it. I would start looking in Duda's classic text Pattern Classification and Scene Analysis or the newer edition Pattern Classification. If it's not there, you could try Chris Bishop's newest book or Daphne Koller and Nir Friedman's recent text.