Suppose M is a set of objects m each having attributes X and Y. Now if X and Y can have only one value for given m (i.e. X,Y are random variables with P(X=x_i|M=m_i), P(Y=y_i|M=m_i)), it's possible to calculate mutual information of X and Y. But what if X can have multiple outcomes at once? I.e. for m_3 X={x1,x2} - generally outcome of X is subset of all possible outcomes. Can mutual information or some other measure of dependence be measured in such a case?

Is it possible to split X into binary random variables X_1, X_2, etc where X_1=1 iff X contains x1, X_1=0 otherwise and then compute I(X_i,Y_j) for all combinations i,j and sum up the information in order to get I(X,Y)?

Thanks.

Example:

```
m_1: X={a,b}, Y={x,y}; m_2: X={c}, Y={z,x}
```