The homogeneous space
G
/
P
λ
G/P_{\lambda }
, where
G
G
is a simple algebraic group and
P
λ
P_{\lambda }
a parabolic subgroup corresponding to a fundamental weight
λ
\lambda
(with respect to a fixed Borel subgroup
B
B
of
G
G
in
P
λ
P_{\lambda }
), is known in at least two settings. On the one hand, it is a projective variety, embedded in the projective space corresponding to the representation with highest weight
λ
\lambda
. On the other hand, in synthetic geometry,
G
/
P
λ
G/P_{\lambda }
is furnished with certain subsets, called lines, of the form
g
B
⟨
r
⟩
P
λ
/
P
λ
gB\langle r\rangle P_{\lambda }/P_{\lambda }
where
r
r
is a preimage in
G
G
of the fundamental reflection corresponding to
λ
\lambda
and
g
∈
G
g\in G
. The result is called the Lie incidence structure on
G
/
P
λ
G/P_{\lambda }
. The lines are projective lines in the projective embedding. In this paper we investigate to what extent the projective variety data determines the Lie incidence structure.