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DM
2010
2010
Perfect dodecagon quadrangle systems
A dodecagon quadrangle is the graph consisting of two cycles: a 12-cycle (x1, x2, ..., x12) and a 4-cycle (x1, x4, x7, x10). A dodecagon quadrangle system of order n and index [DQS] is a pair (X, H), where X is a finite set of n vertices and H is a collection of edge disjoint dodecagon quadrangles (called blocks) which partitions the edge set of Kn, with vertex set X. A dodecagon quadrangle system of order n is said to be perfect [PDQS] if the collection of 4-cycles contained in the dodecagon quadrangles form a 4-cycle system of order n and index
Real-time Traffic| Added | 01 Mar 2011 |
| Updated | 01 Mar 2011 |
| Type | Journal |
| Year | 2010 |
| Where | DM |
| Authors | Lucia Gionfriddo, Mario Gionfriddo |
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