Journal of the Indian Institute of Science

In this article first we shall prove the classical theorem of Burnside which asserts  that the canonical Burnside mark homomorphism of the Burnside algebra B(G) of a finite group G into the product Z-algebra of rank #CG is injective, where CG denote the set of conjugacy classes of the subgroups of G. We further prove that for any finite group G the canonical Z-algebra homomorphism ZCZG ¡æ ZCG maps the Burnside algebra B(ZCG G ) of a finite cyclic group ZG of order #G into the Burnside algebra B(G). We deduce quite a few elementary, but important results in finite group theory by using this canonical algebra homomorphism. Finally we describe the prime spectrum SpecB(G) and maximal spectrum SpmB(G) of B(G).