adjclust
packageThis document has two parts:
the first part aims at clarifying relations between dissimilarity
and similarity methods for hierarchical agglomerative clustering (HAC)
and at explaining implementation choices in
adjclust
;
the second part describes the different types of dendrograms that
are implemented in plot.chac
.
In this document, we assume to be given n objects, {1, …, n} that have to be clustered using adjacency-constrained HAC (CHAC), that is, in such a way that only adjacent objects/clusters can be merged.
We refer to [5] for a comprehensive treatment of the applicability and interpretability of Ward’s hierarchical agglomerative clustering with or without contiguity constraints.
adjclust
The basic implementation of adjclust
takes, as an input,
a kernel k which is supposed
to be symmetric and positive (in the kernel sense). If your data are
under this format, then the constrained clustering can be performed
with
or with
if, in addition, the kernel k is supposed to have only null
entries outside of a diagonal of size h
.
The implementation is the one described in [1].
In this section, the available data set is a matrix s that can either have only positive
entries (in this case it is called a similarity) or both positive and
non-positive entries. If, in addition, the matrix s is normalized,
i.e., s(i, i) + s(j, j) − 2s(i, j) ≥ 0
for all i, j = 1, …, n
then the algorithm implemented in adjclust
can be applied
directly, similarly as for a standard kernel (section 1). This section
explains why this is the case.
The interpretation is similar to the kernel case, under the assumption that small similarity values or similarity values that are strongly negative are less expected to be clustered together than large similarity values. The application of the method is justified by the fact that, for a given matrix s described as above, we can find a λ > 0 such that the matrix kλ defined by ∀ 1, …, n, kλ(i, j) = s(i, j) + λ𝟙{i = j} is a kernel (i.e., the matrix k = s + λI is positive definite; indeed, it is the case for any λ larger than the opposite of the smallest negative eigenvalue of s. [3] shows that the HAC obtained from the distance induced by the kernel kλ in its feature space and the HAC obtained from the ad hoc dissimilarity defined by $$ \forall\, i,j=1,\ldots,n,\qquad d(i,j) = \sqrt{s(i,i) + s(j,j) - 2s(i,j)} $$ are identical, except that all the merging levels are shifted by λ.
In conclusion, to address this case, the command lines that have to be used are the ones described in section 1.
Suppose now that the data set is described by a matrix s as in the previous section except that this similarity matrix is not normalized, meaning that, there is at least one pair (i, j), such that 2s(i, j) > s(i, i) + s(j, j).
The package then performs the following pre-transformation: a matrix s* is defined as ∀ i, j = 1, …, n, s*(i, j) = s(i, j) + λ𝟙{i = j} for a λ large enough to ensure that s* becomes normalized. In the package, λ is chosen as λ := ϵ + maxi, j(2s(i, j) − s(i, i) − s(j, j))+ for a small ϵ > 0. This case is justified by the property described in Section 2.1 (Non-positive but normalized similarities). The underlying idea is that, shifting the diagonal entries of a similarity matrix does not change HAC result and thus they can be shifted until they induce a proper ad-hoc dissimilarity matrix. The transformation affects only the heights to ensure that they are all positive and the two command lines described in the first section of this note are still valid.
The original implementation of (unconstrained) HAC in
stats::hclust
takes as input a dissimilarity matrix.
However, the implementation of adjclust
is based on a
kernel/similarity approach. We describe in this section how the
dissimilarity case is handled.
Suppose given a dissimilarity d which satisfies:
d has non negative entries: d(i, j) ≥ 0 for all i = 1, …, n;
d is symmetric: d(i, j) = d(j, i) for all i, j = 1, …, n;
d has a null diagonal: d(i, i) = 0 for all i = 1, …, n.
Any sequence of positive numbers (ai)i = 1, …, n would provide a similarity s for which d is the ad-hoc dissimilarity by setting: $$ \left\{ \begin{array}{l} s(i,i) = a_i\\ s(i,j) = \frac{1}{2} (a_i + a_j - d^2(i,j)) \end{array} \right. . $$ By definition, such an s is normalized and any choice for (ai)i = 1, …, n yields the same clustering (since they all correspond to the same ad-hoc dissimilarity). The arbitrary choice ai = 1 for all i = 1, …, n has thus been made.
The basic and the sparse implementations are both available with, respectively,
and
In this section, we suppose given an Euclidean distance d between objects (even though the
results described in this section are not specific to this case, they
are described more easily using this framework). Ward’s criterion, that
is implemented in adjclust
aims at minimizing the Error Sum
of Squares (ESS) which is equal to: ESS(𝒞) = ∑C ∈ 𝒞∑i ∈ Cd2(i, gC)
where 𝒞 is the clustering and $g_C = \frac{1}{\mu_C} \sum_{i \in C}
i$ is the center of gravity of the cluster C with μC elements [6].
In the sequel, we will denote:
within-cluster dispersion which, for a given cluster C, is equal to I(C) = ∑i ∈ Cd2(i, gC). We can prove that $I(C) = \frac{1}{2\mu_C} \sum_{i,j \in C} d^2(i,j)$ (see [4] for instance);
average within-cluster dispersion which is equal to $\frac{I(C)}{\mu_C}$ and corresponds to the cluster variance.
Usually, the results of standard HAC are displayed under the form of
a dendrogram for which the heights of the different merges correspond to
the linkage criterion δ(A, B) = I(A ∪ B) − I(A) − I(B)
of that merge. This criterion corresponds to the increase in total
dispersion (ESS) that occurs by merging the two clusters A and B. However, for constrained HAC,
there is no guaranty that this criterion is non decreasing (see [2] for
instance) and thus, the dendrogram build using this method can contain
reversals in its branches. This is the default option in
plot.chac
(that corresponds to
mode = "standard"
). To provide dendrograms that are easier
to interpret, alternative options have been implemented in the package:
the first one is a simple correction of the standard method, and the
three others are suggested by [3].
In the sequel, we denote by (mt)t = 1, …, n − 1 the series of linkage criterion values obtained during the clustering.
mode = "corrected"
This option simply corrects the heights by adding the minimal value making them non decreasing. More precisely, if at a given step t ∈ {2, …, n − 1} of the clustering, we have that mt < mt − 1 then, we define the corrected weights as: $$ \tilde{m}_{t'} = \left\{ \begin{array}{ll} m_{t'} & \textrm{if } t' < t\\ m_{t'} + (m_{t-1} - m_t) & \textrm{otherwise} \end{array} \right.. $$ This correction is iteratively performed for all decreasing merges, ensuring a visually increasing dendrogram.
mode = "total-disp"
This option represents the dendrogram using the total dispersion (that is the objective function) at every level of the clustering. It can easily be proved that the total dispersion is equal to ESSt = ∑t′ ≤ tmt′ and that this quantity is always non decreasing. This is the quantity recommended by [2] to display the dendrogram.
mode = "within-disp"
This option represents a cluster specific criterion by using the within cluster dispersion of the two clusters being merged at every given step of the algorithm. It can be proved that this quantity is also non decreasing, but it is depends strongly on the cluster size, leading to flattened dendrogram in most cases.
mode = "average-disp"
This last option addresses the problem of the dependency to cluster
sizes posed by the previous method ("within-disp"
) by using
the average within-cluster dispersion of the two clusters being merged
at every given step of the algorithm. This criterion is also a cluster
specific one but does not guaranty the absence of reversals in
heights.
As documented in [4], the call to
hclust(..., method = "ward.D")
implicitly assumes that
...
is a squared distance matrix. As explained
above, we did not make such an assumption so
hclust(d^2, method = "ward.D")
and
adjClust(d, method = "dissimilarity")
give identical
results when the ordering of the (unconstrained) clustering is
compatible with the natural ordering of objects used as a constraint. In
addition, since hclust(..., method = "ward.D2")
takes for
linkage $\sqrt{m_t}$,
hclust(d, method = "ward.D2")
and
adjClust(d, method = "dissimilarity")
give identical
results for the merges and the slot height
of the first is
the square root of the slot height
of the second, when the
ordering of the (unconstrained) clustering is compatible with the
natural ordering of objects used as a constraint.
Finally, rioja
uses ESSt to display the heights
of the dendrogram (because, as documented above, this quantity is non
decreasing, in the Euclidean case, even for constrained clusterings).
Hence, rioja(d, method = "coniss")
and
adjClust(d, method = "dissimilarity")
give identical
results for the merges and the slot height
of the first is
the cumulative sum of the slot height
of the second.
[1] Ambroise C., Dehman A., Neuvial P., Rigaill G., and Vialaneix N. (2019). Adjacency-constrained hierarchical clustering of a band similarity matrix with application to genomics. Algorithms for Molecular Biology, 14, 22.
[2] Grimm, E.C. (1987) CONISS: a fortran 77 program for stratigraphically constrained cluster analysis by the method of incremental sum of squares. Computers & Geosciences, 13(1), 13-35.
[3] Miyamoto S., Abe R., Endo Y., Takeshita J. (2015) Ward method of hierarchical clustering for non-Euclidean similarity measures. In: Proceedings of the VIIth International Conference of Soft Computing and Pattern Recognition (SoCPaR 2015).
[4] Murtagh, F. and Legendre, P. (2014) Ward’s hierarchical agglomerative clustering method: which algorithms implement Ward’s criterion? Journal of Classification, 31, 274-295.
[5] Randriamihamison N., Vialaneix N., & Neuvial P. (2020). Applicability and interpretability of Ward’s hierarchical agglomerative clustering with or without contiguity constraints. Journal of Classification 38, 1-27.
[6] Ward, J.H. (1963) Hierarchical grouping to optimize an objective function. Journal of the American Statistical Association, 58(301), 236-244.