A new approach to convolution and semi-direct products of groups

Abstract

Let H and K be locally compact groups and τ:H Aut(K) be a continuous homomorphism and also let Gτ=Hτ K be the semi-direct product of H and K with respect to τ. We define left and also right τ-convolution on L1(Gτ) such that L1(Gτ) with respect to each of them is a Banach algebra. Also we define τ-convolution as a linear combination of the left and right τ-convolution. We show that the τ-convolution is commutative if and only if K is abelian and also when H and K are second countable groups, the τ-convolution coincides with the standard convolution of L1(Gτ) if and only if H is the trivial group. We prove that there is a τ-involution on L1(Gτ) such that L1(Gτ) with respect to the τ-involution and τ-convolution is a non-associative Banach *-algebra and also it is also shown that when K is abelian, the τ-involution and τ-convolution makes L1(Gτ) into a Jordan Banach *-algebra.