Certain circulant graphs C_16(1,2,7) and C_16(2,3,5) are Type-2 isomorphic w.r.t. m=2, and for n>=2 families C_8n(R) with R={2,2s-1,4n-(2s-1)} and C_8n(S) are Type-2 isomorphic w.r.t. m=2 under stated conditions on n and s.
of Chemistry, Hindawi Pub
2 Pith papers cite this work. Polarity classification is still indexing.
2
Pith papers citing it
citation-role summary
background 1
citation-polarity summary
fields
math.CO 2verdicts
UNVERDICTED 2roles
background 1polarities
background 1representative citing papers
Proves that C_{np^3}(R^{np^3,x+yp}_i) for i=1 to p are Type-2 isomorphic w.r.t. m=p and form an Abelian group T2_{np^3,p} under the operation defined by index addition modulo p.
citing papers explorer
-
A study on Type-2 isomorphic circulant graphs. Part 1: Type-2 isomorphic circulant graphs $C_n(R)$ w.r.t. $m$ = 2
Certain circulant graphs C_16(1,2,7) and C_16(2,3,5) are Type-2 isomorphic w.r.t. m=2, and for n>=2 families C_8n(R) with R={2,2s-1,4n-(2s-1)} and C_8n(S) are Type-2 isomorphic w.r.t. m=2 under stated conditions on n and s.
-
A study on Type-2 isomorphic circulant graphs. Part 10: Type-2 isomorphic $C_{np^3}(R)$ w.r.t. $m$ = $p$ and related groups
Proves that C_{np^3}(R^{np^3,x+yp}_i) for i=1 to p are Type-2 isomorphic w.r.t. m=p and form an Abelian group T2_{np^3,p} under the operation defined by index addition modulo p.