We study five-dimensional pseudo-Riemannian h-spaces \(H_{221}\) of type \(\{221\}\).
Necessary and sufficient conditions are determined under which \(H_{221}\) is a
space of constant (zero) curvature.
Nonhomothetical projective motions in \(H_{221}\) of nonconstant curvature
are found, homotheties and isometries of the indicated spaces are investigated.
Dimensions, basis elements, and structure equations of maximal projective Lie
algebras acting in \(H_{221}\) of nonconstant curvature are determined.
As a result, the classification of h-spaces \(H_{221}\) of type \(\{221\}\) by
(non-homothetical) Lie algebras of infinitesimal
projective and affine transformations is obtained.