K-mer based distance estimation
K-mer based distance estimation is an alternative to estimating
evolutionary distance based on multiple alignments. At a high level, the distance
between two sequences is defined by first collecting the set of k-mers (subsequences of length k)
occuring in the two
sequences. From these two sets, the evolutionary distance between the
two organisms is now defined by measuring how different the two sets are. The more the two sets look alike, the smaller is the
evolutionary distance. The main motivation for estimating evolutionary
distance based on k-mers, is that it is computationally much faster
than first constructing a multiple alignment. Experiments show
that phylogenetic tree reconstruction using k-mer based distances
can produce results comparable to the slower multiple alignment based
methods [Blaisdell, 1989].
All of the k-mer based distance measures completely ignores the ordering of the k-mers inside the input sequences. Hence, if the selected k value (the length of the sequences) is too small, very distantly related organisms may be assigned a small evolutionary distance (in the extreme case where k is , two organisms will be treated as being identical if the frequency of each nucleotide/amino-acid is the same in the two corresponding sequences). In the other extreme, the k-mers should have a length (k) that is somewhat below the average distance between mismatches if the input sequences were aligned (in the extreme case of k=the length of the sequences, two organisms have a maximum distance if they are not identical). Thus the selected k value should not be too large and not too small. A general rule of thumb is to only use k-mer based distance estimation for organisms that are not too distantly related.
Formal definition of distance. In the following, we give a more formal definition of the three supported distance measures: Euclidian-squared, Mahalanobis and Fractional common k-mer count. For all three, we first associate a point to every input sequence . Each point has one coordinate for every possible length k sequence (e.g. if represent nucleotide sequences, then has coordinates). The coordinate corresponding to a length k sequence has the value: ``number of times occurs as a subsequence in ''. Now for two sequences and , their evolutionary distance is defined as follows:
- Euclidian squared: For this measure, the distance is
simply defined as the
(squared Euclidian) distance between the two points and ,
i.e.
- Mahalanobis: This measure is essentially a fine-tuned
version of the Euclidian squared distance measure. Here all the
counts are ``normalized'' by dividing with the standard
deviation of
the count for the k-mer. The revised formula thus becomes:
- Fractional common k-mer count: For the last measure,
the distance is computed based on the minimum count of every k-mer
in the two sequences, thus if two sequences are very different, the
minimums will all be small. The formula is as follows:
In experiments performed in [Hï¿12hl et al., 2007], the Mahalanobis distance measure seemed to be the best performing of the three supported measures.