Title of article :
Dihedral Groups as Epimorphic Images of Some Fibonacci Groups
Author/Authors :
Umar, Abdullahi Sultan Qaboos University - Department of Mathematics and Statistics, Oman , Ali, Bashir Nigerian Defence Academy - Department of Mathematics and Computer Science, Nigeria
Abstract :
The Fibonacci groups are defined by the presentation F (r,n)= (a1, a2, . . . , an : a1a2 · · · ar = ar+1, a2a3 . . . ar+1= ar+2, . . ., ana1 . . .ar-1=ar) where r 0 , n 0 and all subscripts are assumed to be reduced modulo n . In this paper we give an alternative proof that for r ≥ 0 , F(2r, 4r + 2) , F(4r + 3, 8r + 8) and F(4r + 5, 8r + 12) are all infinite by establishing a morphism (or group homomorphism) onto the dihedral group n D for all n 2 .
Keywords :
Group , Fibonacci group , Dihedral group , (homo) Morphism.
Journal title :
Sultan Qaboos University Journal for Science
Journal title :
Sultan Qaboos University Journal for Science
