The Oka-Grauert principle states that for any Stein manifold the holomorphic and the topological classification of complex vector bundles on coincide. The original reference is (Grauert 58).
The principle should maybe better be called the Oka-Grauert-Gromov principle/theory. Gromov viewed it in his book on partial differential relations as one of the examples of h-principle.
K. Oka, Sur les fonctions des plusieurs variables. III: Deuxième problème de Cousin, J. Sc. Hiroshima Univ. 9, 7–19 (1939)
H. Grauert, Analytische Faserungen über holomorph-vollständigen Räumen, Math. Ann. 135, 263–-273 (1958) doi
M. Gromov, Oka’s principle for holomorphic sections of elliptic bundles, J. Amer. Math. Soc. 2 (1989), 851–-897.
Finnur Lárusson, What is an Oka manifold, Notices AMS, pdf
Franc Forstnerič, Finnur Lárusson, Survey of Oka theory, arxiv/1009.1934
F. Forstnerič, The Oka principle for sections of stratified fiber bundles, Pure Appl. Math. Quarterly (Special Issue in honor of Joseph J. Kohn), 6 (2010), no. 3, 843–874, arxiv/0705.0591
There is now a model category structure on a category of presheaves of simplicial version of a Stein site where Oka maps are a fibration: