Dual Numbers, Weighted Quivers, and Extended Somos and Gale-Robinson Sequences

Abstract: We investigate a general method that allows one to construct new integer sequences extending existing ones. We apply this method to the classic Somos-4 and Somos-5, and the Gale-Robinson sequences, as well as to more general class of sequences introduced by Fordy and Marsh, and produce a great number of new sequences. The method is based on the notion of "weighted quiver", a quiver with a Z-valued function on the set of vertices that obeys very special rules of mutation.

“…Moreover, for some "mysterious" reasons, the new sequence pα n q nPN turns out to be integer! This idea to construct dual integer sequences was suggested in [7,8] and applied to the Gale-Robinson and Somos sequences. Today I will go further and apply it to several other interesting sequences, making the method more universal.…”

“…This integrality persists thanks to a "miracle", called the Laurent phenomenon [2], the same miracle that guarantees integrality of the Somos and Gale-Robinson sequences. The complete proof is too technical to be reproduced here, a general statement can be found in [8].…”

Shadow sequences of integers, from Fibonacci to Markov and back

“…Moreover, for some "mysterious" reasons, the new sequence pα n q nPN turns out to be integer! This idea to construct dual integer sequences was suggested in [7,8] and applied to the Gale-Robinson and Somos sequences. Today I will go further and apply it to several other interesting sequences, making the method more universal.…”

“…This integrality persists thanks to a "miracle", called the Laurent phenomenon [2], the same miracle that guarantees integrality of the Somos and Gale-Robinson sequences. The complete proof is too technical to be reproduced here, a general statement can be found in [8].…”

Shadow sequences of integers, from Fibonacci to Markov and back

“…Steps towards defining super cluster algebras appeared in work of Ovsienko [15] and separately in the work of Li, Mixco, Ransingh, and Srivastava [12]. These initial steps were followed up by related work such as [16,17,21].…”

An Expansion Formula for Decorated Super-Teichmüller Spaces

“…(2) a negative value of w(x i ) corresponds to the number of 2-path ξ 2 → x i → ξ 1 . This function was called the weight function in [17] where it was applied to integer sequences.…”

“…where ε := ξ 1 ξ 2 denotes the product of the odd variables (cf. [17]). Indeed, one obviously has (1 + ε) w k = (1 + w k ε) since ε 2 = 0.…”

Cluster algebras with Grassmann variables