Undeterred after three decades of looking, and with some assistance from a supercomputer, mathematicians have finally discovered a new example of a special integer called a Dedekind number.
In mathematics, the Dedekind numbers are a rapidly growing sequence of integers named after Richard Dedekind, who defined them in 1897. The Dedekind number M(n) is the number of monotone boolean functions of n variables. Equivalently, it is the number of antichains of subsets of an n-element set, the number of elements in a free distributive lattice with n generators, and one more than the number of abstract simplicial complexes on a set with n elements.
Pretty simple to understand. I mean, I understand it, for sure. Totally.
Good work everyone. I stay more with the stereo boolean variables, but the news about those lattices being free now is really great stuff. We really did something here
I looked it up on Wikipedia.
Pretty simple to understand. I mean, I understand it, for sure. Totally.
Ah, yes, those things, of course.
Glad we cleared that up. In hindsight, it was pretty obvious from the start.
Ah, yes. I know
somenone of these words.I understood most of the words, just the ones that I didn’t made the rest incomprehensible garbledygoop
Good work everyone. I stay more with the stereo boolean variables, but the news about those lattices being free now is really great stuff. We really did something here
Lol, I thought that at first, but I’m pretty sure it’s in how much larger the next number is to the last one.
Long slaughtering necromancer math