Spacetimes admitting a group of (local) projective collineations are c
onsidered. In an n-dimensional proper Einstein space it is shown that
any vector field xi(i) generating a proper projective collineation (th
at is one which is not an affine collineation) is the gradient of a sc
alar field phi (up to the addition of a Killing vector field). Then a
four-dimensional Einstein spacetime admitting a proper projective coll
ineation is shown to have constant curvature. For an n-dimensional spa
ce of non-zero constant curvature, the scalar field phi satisfies a sy
stem of third-order linear differential equations. The complete soluti
on of this system is found in closed form and depends on (n + 1)(n + 2
)/2 arbitrary constants. All gradient vector fields xi(i) generating p
rojective collineations are found explicitly and together with the n(n
+ 1) /2 killing vector fields generate a Lie algebra of dimension n(n
+ 2).