Given a group
G
G
, we construct, in a canonical way, an inverse semigroup
S
(
G
)
\mathcal {S}(G)
associated to
G
G
. The actions of
S
(
G
)
\mathcal {S}(G)
are shown to be in one-to-one correspondence with the partial actions of
G
G
, both in the case of actions on a set, and that of actions as operators on a Hilbert space. In other words,
G
G
and
S
(
G
)
\mathcal {S}(G)
have the same representation theory. We show that
S
(
G
)
\mathcal S(G)
governs the subsemigroup of all closed linear subspaces of a
G
G
-graded
C
∗
{C}^*
-algebra, generated by the grading subspaces. In the special case of finite groups, the maximum number of such subspaces is computed. A “partial” version of the group
C
∗
{ C}^*
-algebra of a discrete group is introduced. While the usual group
C
∗
{ C}^*
-algebra of finite commutative groups forgets everything but the order of the group, we show that the partial group
C
∗
{ C}^*
-algebra of the two commutative groups of order four, namely
Z
/
4
Z
Z/4 Z
and
Z
/
2
Z
⊕
Z
/
2
Z
Z/2 Z \oplus Z/2 Z
, are not isomorphic.