Abstract

Rafal Ablamowicz have shown the Classification of Clifford algebra 〖Cl〗_((p,q)) as images of group algebra of SalingarosVeegroup G_((p,q)).Here G_((p,q)) is a 2-group of order2^(p+q+1) belonging to one of Salingaros isomorphic classes N_(2k-1),N_2k,Ω_(2k-1),Ω_2k and S_kwhich are non-isomorphic to each other and every real Clifford Algebra 〖Cl〗_((p,q)) is R -isomorphic to a quotient of a group algebra 〖R[G〗_((p,q))]. In this paper we show how group structure of Salingaros Vee group G_((p,q)) in the presence of normal subgroup and central product structure carry over Clifford Algebra 〖Cl〗_((p,q)).

Description