A-graded algebras and continued fractions

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

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

In this paper we continue our work on Koszul algebras initiated in earlier studies. The consideration about the existence of almost split sequences for Koszul modules appeared in our early work and only a partial answer is known. Koszul duality relates finite dimensional algebras of infinite global

Pincherle theorems equate convergence of a continued fraction to existence of a recessive solution of the associated linear system. Matrix continued fractions have recently been used in the study of singular potentials in high energy physics. The matrix continued fractions and discrete Riccati equat