I think there are three different aspects of this problem that you test.

The first one: is my algorithm the right one? That is, given a properly-functioning random-number generator, will it produce dates that are randomly distributed across the range?

The second one: does the algorithm handle edge cases properly? That is, when the random number generator produces the highest or lowest allowable values, does anything break?

The third one: is my implementation of the algorithm working? That is, given a known list of pseudo-random inputs, is it producing the expected list of pseudo-random dates?

The first two things aren't something I'd build into the unit-testing suite. They're something I'd prove out while designing the system. I'd probably do this by writing a test harness that generated a zillion dates and performed a chi-square test, as daniel.rikowski suggested. I'd also make sure this test harness didn't terminate until it handled both of the edge cases (assuming that my range of random numbers is small enough that I can get away with this). And I'd document this, so that anyone coming along and trying to improve the algorithm would know that that's a breaking change.

The last one *is* something I'd make a unit test for. I need to know that nothing has crept into the code that breaks its implementation of this algorithm. The first sign I'll get when that happens is that the test will fail. Then I'll go back to the code and find out that someone else thought that they were fixing something and broke it instead. If someone *did* fix the algorithm, it'd be on them to fix this test too.