## Tuesday, June 23, 2015

### Is QCA it's own worst enemy?

[As you may have read elsewhere on this blog] QCA stands for Qualitative Comparative Analysis. It is a method that is finding increased use as an evaluation tool, especially for exploring claims about the causal role of interventions of various kinds. What I like about it is its ability to recognize and analyse complex causal configurations, which have some fit with the complexity of the real world as we know it.

What I don't like about it is its complexity, it can sometimes be annoyingly obscure and excessively complicated. This is a serious problem if you want to see the method being used more widely and if you want the results to be effectively communicated and properly understood. I have seen instances recently where this has been such a problem that it threatened to derail an ongoing evaluation.

In this blog post I want to highlight where the QCA methodology is unnecessary complex and and suggest some ways to avoid this type of problem. In fact I will start with the simple solution, then explain how QCA manages to make it more complex.

Let me start with a relatively simple perspective. QCA analyses fall in to the broad category of "classifiers". These include a variety of algorithmic processes for deciding what category various instances belongs to. For example which types of projects were successful or not in achieving their objectives.

I will start with a two by two table, a Truth Table, showing the various possible results that can be found, by QCA and other methods. Configuration X here is a particular combination of conditions that an analysis has found to be associated with the presence of an outcome. The Truth Table helps us identify just how good that association is, by comparing the incidences where the configuration is present or absent with the incidences where the outcome is present or absent.

As I have explained in an earlier blog, one way of assessing the adequately of the result shown in such a matrix is by using a statistical test such as Chi Square, to see if the distribution is significantly different from what a chance distribution would look like.There are only two possible results when the outcome is present: the association is statistically significant or it is not.

However, if you import the ideas of Necessary and/or Sufficient causes the range of interesting results increases. The matrix can now show four possible types of results when the outcome is present:

1. The configuration of conditions is Necessary and Sufficient for the outcome to be present. Here cells C and B would be empty of cases
2. The configuration of conditions is Necessary but Insufficient for the outcome to be present. Here cell C would be empty of cases
3. The configuration of conditions is Unnecessary but Sufficient for the outcome to be present. Here cell  B would be empty of cases
4. The configuration of conditions is Unnecessary and Insufficient for the outcome to be present. Here no cells would be empty of cases
The interesting thing about the first three options is that they are easy to disprove. There only needs to be one case found in the cell(s) meant to be empty, for that claim to be falsified.

And we can provide a lot more nuance to the type 4 results, by looking at the proportion of cases found in cells B and C, relative to cell A. The proportion of A/(A+B) tells us about the consistency of the results, in the simple sense of consistency of results found via an examination of a QCA Truth Table. The proportion of A/(A+B) tells us about the coverage of the results, as in the proportion of all present outcomes that exist that were identified by the configuration.

So how does QCA deal with all this? Well, as far as I can see, it does so in a way makes it more complex than necessary. Here I am basing my understanding mainly on Schneider and Wagemann's account of QCA.
1. Firstly, they leave aside the simplest notions of Necessity and Sufficiency as described above, which are based on a categorical notion of Necessity and Sufficiency i..e a configuration either is or is not Sufficient etc. One of the arguments I have seen for doing this is these types of results are rare and part of this may be due to measurement error, so we should take  more generous/less demanding view of what constitutes Necessity and Sufficiency
2. Instead they focus on Truth Tables with results as shown below (classed as 4. Unnecessary and Insufficient above). They then propose ways of analyzing these in terms of having degrees of Necessity and Sufficiency conditions. This involves two counter-intuitive mirror-opposite ways of measuring the consistency and coverage of the results, according to whether the focus is on analyzing the extent of Sufficiency or Necessity conditions (see Chapter 5 for details)
3. Further complicating the analysis is the introduction of a minimum thresholds for the consistency of Necessity and Sufficiency conditions (because the more basic categorical idea has been put aside). There is no straightforward basis for defining these levels. It is suggested that they depend on the nature of the problem being identified.

Configuration X contains conditions which are neither Necessary or Sufficient

Using my strict interpretation of Sufficiency and Necessity there is no need for a consistency measure where a condition (or configuration) is found to be Sufficient but Unnecessary, because there will be no cases in cell B. Likewise, there is no need for a coverage measure where a condition (or configuration) is found to be Necessary but Insufficient, because there will be no cells in cell C,

We do need to know the consistency where a condition (or configuration) is Necessary but Insufficient, and the the coverage, where where a condition (or configuration) is found to be Sufficient but Unnecessary.