Quantum black holes, partition of integers and self-similarity

Abstract

We take the view that the area of a black hole's event horizon is quantized, A = lP2 \, (4 2) \, N, and the associated degrees of freedom are finite in number and of fermionic nature. We then investigate general aspects of the entropy, SBH, our main focus being black-hole self-similarity. We first find a two-to-one map between the black hole's configurations and the ordered partitions of the integer N. Hence we construct from there a composition law between the sub-parts making the whole configuration space. This gives meaning to black hole self-similarity, entirely within a single description, as a phenomenon stemming from the well known self-similarity of the ordered partitions of N. Finally, we compare the above to the well-known results on the subleading (quantum) corrections, that necessarily require different (quantum) statistical weights for the various configurations.