Elementary Elliptic (R, q)-polycycles (CROSBI ID 38077)
Prilog u knjizi | izvorni znanstveni rad
Podaci o odgovornosti
Deza, Michel ; Dutour Sikirić, Mathieu ; Shtogrin, Mikhail
engleski
Elementary Elliptic (R, q)-polycycles
A (R, q)-polycycle is, roughly, a map, whose faces, besides some disjoint holes, are i-gons with i in R, and whose vertices, outside of holes, are q-valent. Such polycycle is called elliptic, parabolic or hyperbolic if 1/q+1/r-1/2 (where r=max R) is positive, zero or negative, respectively. In elliptic case, we list all elementary (R, q)-polycycles, i.e. such that any (R, q)-polycycle is uniquely decomposed into agglomeration of elementary (R, q)-polycycles.
plane graphs ; enumeration
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Podaci o prilogu
351-376.
objavljeno
10.1002/9783527627981.ch14
Podaci o knjizi
Analysis of Complex Networks, From Biology to Linguistics
Dehmer, Matthias ; Emmert-Streib, Frank
Weinheim: Wiley-Blackwell
2009.
978-3-527-32345-6