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For every action $ϕ\in\text{Hom}(G,\text{Aut}_k(K))$ of a group $G$ on a commutative ring $K$ we introduce two abelian monoids. The monoid $\text{Cliff}_k(ϕ)$ consists of equivalent classes of $G$-graded Clifford system extensions of type $ϕ$ of $K$-central algebras. The monoid $\mathcal{C}_k{(ϕ)}$ consists of equivariant classes of generalized collective characters of type $ϕ$ from $G$ to the Picard groups of $K$-central algebras. Furthermore, for every such $ϕ$ there is an exact sequence of abelian monoids $$0\to H^2(G,K^*_ϕ)\to\text{Cliff}_k(ϕ)\to\mathcal{C}_k{(ϕ)}\to H^3(G,K^*_ϕ).$$ The rightmost homomorphism is often surjective, terminating the above sequence. When $ϕ$ is a Galois action, then the restriction-obstruction sequence of Brauer groups is an image of an exact sequence of sub-monoids of this sequence.