Almost free modules and Mittag--Leffler conditions

Drinfeld recently suggested to replace projective modules by the flat Mittag--Leffler ones in the definition of an infinite dimensional vector bundle on a scheme $X$. Two questions arise: (1) What is the structure of the class $\mathcal D$ of all flat Mittag--Leffler modules over a general ring? (2) Can flat Mittag--Leffler modules be used to build a Quillen model category structure on the category of all chain complexes of quasi--coherent sheaves on $X$? We answer (1) by showing that a module $M$ is flat Mittag--Leffler, if and only if $M$ is $\aleph_1$--projective in the sense of Eklof and Mekler. We use this to characterize the rings such that $\mathcal D$ is closed under products, and relate the classes of all Mittag--Leffler, strict Mittag--Leffler, and separable modules. Then we prove that the class $\mathcal D$ is not deconstructible for any non--right perfect ring. So unlike the classes of all projective and flat modules, the class $\mathcal D$ does not admit the homotopy theory tools developed recently by Hovey . This gives a negative answer to (2).