Continued Fractions and Series

We show that the simple continued fractions for the analogues of (ae 2Ân +b)Â(ce 2Ân +d ) in function fields, with the usual exponential replaced by the exponential for F q [t] have very interesting patterns. These are quite different from their classical counterparts. We also show some continued fr

A matrix continued fraction is defined and used for the approximation of a function F known as a power series in 1Âz with matrix coefficients p\_q, or equivalently by a matrix of functions holomorphic at infinity. It is a generalization of P-fractions, and the sequence of convergents converges to th

Babson and Steingrimsson (2000, Séminaire Lotharingien de Combinatoire, B44b, 18) introduced generalized permutation patterns that allow the requirement that two adjacent letters in a pattern must be adjacent in the permutation. Let f τ ;r (n) be the number of 1-3-2-avoiding permutations on n lett

For each rational number not less than 2, we provide an explicit family of continued fractions of algebraic power series in finite characteristic (together with the algebraic equations they satisfy) which has that rational number as its diophantine approximation exponent. We also provide some non-qu

This paper studies the enumerations and some interesting combinatorial properties of heap-ordered trees (HOTs). We first derive analytically the total numbers of \(n\)-node HOTs. We then show that there exists a 1-1 and onto correspondence between any two of the following four sets: the set of \((n+