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The following pages link to On algorithmic study of non-negative posets of corank at most two and their Coxeter-Dynkin types (Q2805472):

Displaying 17 items.

A Gram classification of non-negative corank-two loop-free edge-bipartite graphs (Q272348) (← links)
Structure and a Coxeter-Dynkin type classification of corank two non-negative posets. (Q486202) (← links)
Inflation algorithm for loop-free non-negative edge-bipartite graphs of corank at least two (Q526287) (← links)
A Gram classification of principal Cox-regular edge-bipartite graphs via inflation algorithm (Q1634759) (← links)
A Coxeter spectral classification of positive edge-bipartite graphs. I: Dynkin types \(\mathcal{B}_n\), \(\mathcal{C}_n\), \(\mathcal{F}_4\), \(\mathcal{G}_2\), \(\mathbb{E}_6\), \(\mathbb{E}_7\), \(\mathbb{E}_8\) (Q1790462) (← links)
A framework for Coxeter spectral classification of finite posets and their mesh geometries of roots. (Q1950019) (← links)
Congruence of rational matrices defined by an integer matrix (Q2101923) (← links)
On mesh geometries of root Coxeter orbits and mesh algorithms for corank two edge-bipartite signed graphs (Q2228131) (← links)
A Coxeter spectral classification of positive edge-bipartite graphs. II: Dynkin type \(\mathbb{D}_n\) (Q2228525) (← links)
Applications of mesh algorithms and self-dual mesh geometries of root Coxeter orbits to a Horn-Sergeichuk type problem (Q2244873) (← links)
On the structure of loop-free non-negative edge-bipartite graphs (Q2272490) (← links)
A Coxeter type classification of one-peak principal posets (Q2332382) (← links)
On Coxeter type study of non-negative posets using matrix morsifications and isotropy groups of Dynkin and Euclidean diagrams. (Q2346584) (← links)
Symbolic computation of strong Gram congruences for Cox-regular positive edge-bipartite graphs with loops (Q2419038) (← links)
On algorithmic Coxeter spectral analysis of positive posets (Q2656718) (← links)
Programming in PYTHON and an algorithmic description of positive wandering on one-peak posets (Q2857381) (← links)
Algorithmic computation of principal posets using Maple and Python (Q5173848) (← links)