横条向量和酉横条

IF 0.4 Q4 MATHEMATICS, APPLIED Journal of Combinatorics Pub Date : 2018-06-04 DOI:10.4310/joc.2020.v11.n4.a6
E. Gunawan, R. Schiffler
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引用次数: 10

摘要

设Q为无环2环的颤振,设a (Q)为相应的簇代数,设x为簇。我们引入了一类新的整数向量,我们称之为相对于x的frieze向量。这些frieze向量被定义为由聚类代数中的聚类变量给出的某些Diophantine方程的解。我们证明了每个聚类都会产生一个frieze向量,frieze向量决定了聚类。我们还研究了从聚类代数到任意积分域的Q型矩阵的同态。特别地,我们证明了仿射Dynkin型A的每一个正积分frieze是酉的,这意味着它是通过将一个簇中的每个簇变量特化为常数1而得到的。这完成了对Dynkin型和仿射Dynkin型的所有正积分frieze的统一性问题的回答。
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Frieze vectors and unitary friezes
Let Q be a quiver without loops and 2-cycles, let A(Q) be the corresponding cluster algebra and let x be a cluster. We introduce a new class of integer vectors which we call frieze vectors relative to x. These frieze vectors are defined as solutions of certain Diophantine equations given by the cluster variables in the cluster algebra. We show that every cluster gives rise to a frieze vector and that the frieze vector determines the cluster. We also study friezes of type Q as homomorphisms from the cluster algebra to an arbitrary integral domain. In particular, we show that every positive integral frieze of affine Dynkin type A is unitary, which means it is obtained by specializing each cluster variable in one cluster to the constant 1. This completes the answer to the question of unitarity for all positive integral friezes of Dynkin and affine Dynkin types.
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来源期刊
Journal of Combinatorics
Journal of Combinatorics MATHEMATICS, APPLIED-
自引率
0.00%
发文量
21
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