Let $(X,\mathcal A, \mu ), (X, \mathcal A, \nu)$ be two measure spaces. Show $\lambda(A)=\min(\mu(A), \nu(A))$ is in general no measure on $(X, \mathcal A)$
It may be an easy question but I am really going crazy as I can't find a counterexample. I tried combinations of the trivial measure and counting measure but never got the desired results. Please release me from this pain.
Let's use $X = \{x_{1}, x_{2}\}$ be a set consisting of just two points, ${\cal A}$ = the set of all (four:) subsets of $X$, and the measures defined by the following: $$ \mu(\{x_{1}\}) = 1, \quad \mu(\{x_{2}\}) = 0, $$ $$ \nu(\{x_{1}\}) = 0, \quad \nu(\{x_{2}\}) = 1. $$
Now, check whether additivity holds: does $$ \lambda(\{x_{1}, x_{2}\}) $$ equal $$ \lambda(\{x_{1}\}) + \lambda(\{x_{2}\})? $$