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Computational Classification of Tubular Algebras

Dowbor Piotr, Kim Yan

Fundamenta Informaticae

2020

Vol. 177, nr 1

39--67

The effective method (based on Theorem 5.3) of classifying tubular algebras by the Cartan matrices of tilting sheaves over weighted projective lines with all indecomposable direct summands in some finite “fundamental domain” , by the reduction to the two elementary problems of discrete mathematics having algorithmic solutions is presented in details (see Problem A and B). The software package CART_TUB being an implementation of this method yields the precise classification of all up to isomorphism tubular algebras of a fixed tubular type p, by creating the complete lists of their Cartan matrices, and furnish their tilting realizations. In particular, the number of isomorphism classes of tubular algebras of the type p is determined (Theorem 2.3).

Symbolic Algorithms Computing Gram Congruences in the Coxeter Spectral Classification of Edge-bipartite Graphs. [Part 2], Isotropy Mini-groups

Simson D.

Fundamenta Informaticae

2016

Vol. 145, nr 1

49--80

In this two parts article with the same title we continue the Coxeter spectral study of the category UBigrm of loop-free edge-bipartite (signed) graphs Δ, with m ≥ 2 vertices, we started in [SIAM J. Discr. Math. 27(2013), 827-854] for corank r = 0 and r = 1. Here we study the class of all non-negative edge-bipartite graphs Δ ∈ UBigrn+r of corank r ≥ 0, up to a pair of the Gram Z-congruences ;~z and ≈z, by means of the non-symmetric Gram matrix ĞΔ∈Mn+r(Z) of Δ, the symmetric Gram matrix GΔ:=1/2[ĞΔ+ĞΔ-tr]∈Mn+r(Z), the Coxeter matrix CoxΔ:[formula...], its spectrum speccΔ⊂C, called the Coxeter spectrum of Δ, and the Dynkin type DynΔ∈{An,Dn,E6,E7,E8} associated in Part 1 of this paper. One of the aims in the study of the category UBigrn+r is to classify the equivalence classes of the non-negative edge-bipartite graphs in UBigrn+r with respect to each of the Gram congruences ~Z and ≈Z. In particular, the Coxeter spectral analysis question, when the congruence Δ≈ZΔ′ holds (hence also Δ~ZΔ′ holds), for a pair of connected non-negative graphs Δ,Δ′∈uBigrn+rsuch that speccΔ=speccΔ′ and DynΔ=DynΔ′, is studied in the paper. One of our main aims in this Part 2 of the paper is to get an algorithmic description of a matrix B defining the strong Gram Z-congruence Δ≈ZΔ′, that is, a Z-invertible matrix B∈Mn+r(Z) such that [formula...]. We obtain such a description for a class of non-negative connected edge-bipartite graphs Δ∈uBigrn+r of corank r = 0 and r = 1. In particular, we construct symbolic algorithms for the calculation of the isotropy mini-group ..., for a class of edge-bipartite graphs Δ∈uBigrn+r. Using the algorithms, we calculate the isotropy mini-groupGl(n,Z)D where D is any of the Dynkin bigraphs An, Bn, Cn, Dn, E6, E7, E8, F4, G2 and .D is any of the Euclidean graphs .[formula...].