I needed some information about the intersection of the kernels of invariant means on hypergroups. So I read the discussion made for the question " The kernel of all invariant means " which answer my question in the case of groups. It seems that it is somehow applicable for hypergroups. Now my question is "Does the kernel of an invariant mean on a hypergroup include strictly positive functions?"

I needed some information about the intersection of the kernels of invariant means on hypergroups. So I read the discussion made for the question " The kernel of all invariant means " which answer my question in the case of groups. It seems that it is somehow applicable for hypergroups. Now my question is "Does the kernel of an invariant mean on a hypergroup include strictly positive functions?"

I needed some information about the intersection of the kernels of invariant means on hypergroups. So I study the discussion made for the question " The kernel of all invariant means " which answer my question in the case of groups. It seems that it is somehow applicable for hypergroups. Now my question is "Does the kernel of an invariant mean on a hypergroup include strictly positive functions?"

I needed some information about the intersection of the kernels of invariant means on hypergroups. So I read the discussion made for the question " The kernel of all invariant means " which answer my question in the case of groups. It seems that it is somehow applicable for hypergroups. Now my question is "Does the kernel of an invariant mean on a hypergroup include strictly positive functions?"