In this paper we give the étale local classification of Schelter-Procesi smooth orders in central simple algebras. In particular, we prove that if
Δ
\Delta
is a central simple
K
K
-algebra of dimension
n
2
n^2
, where
K
K
is a field of trancendence degree
d
d
, then there are only finitely many étale local classes of smooth orders in
Δ
\Delta
. This result is a non-commutative generalization of the fact that a smooth variety is analytically a manifold, and so has only one type of étale local behaviour.