Author/Authors :
Miri ، Mohammad Reza Faculty of Mathematics Science and Statistics - University of Birjand , Nasrabadi ، Ebrahim Faculty of Mathematics Science and Statistics - University of Birjand , Kazemi ، Kianoush Faculty of Mathematics Science and Statistics - University of Birjand
Abstract :
For a discrete semigroup S and a left multiplier operator T on S, there is a new induced semigroup ST, related to S and T. In this paper, we show that if T is multiplier and bijective, then the second module cohomology groups H_l^1(E)^2(l^1(S), l^∞(S)) and H_l^1(E_T)^2(l^1(S_T), l^∞(S_T)) are equal, where E and E_T are subsemigroups of idempotent elements in S and S_{T}, respectively. Finally, we show thet, for every odd n ∈N, H_l^1(E_T)^2(l^1(S_T), l^1(S_T)^(n)) is a Banach space, when S is a commutative inverse semigroup.
Keywords :
Second module cohomology group , Inverse semigroup , Induced semigroup , Semigroup algebra
