Quark interpretation of the combinatorial hierarchy

We give a combinatorial interpretation of punctured partitions (i.e., n-tuples ( p 1 , p 2 , ..., p n ) of natural numbers such that p 1 + p 2 + } } } + p k =k whenever p k {0) in terms of linear partitions of linearly ordered sets. As an application we give an explicit expression of the permanent (

In this paper the generalized Fibonacci numbers of order k are combinatorially interpreted, in the context of the theory of linear species of Joyal, as the linear species of k-filtering partitions.

## Abstract This proceeding is based on the paper 0905.3044 [hep‐th]. We analyze the problem of the hierarchy of masses and mixings in orientifold realizations of the Standard Model. We present a bottom‐up brane configuration that can generate such hierarchies.

Conti et al. defined a two-variable polynomial associated with any rooted tree. In this paper we give an explicit combinatorial interpretation of the coefficients of this polynomial. In order to do this we introduce a special class of subtrees which seem to have never been considered before in the l