On drift, diffusion and geometry

We present some reflections on the links between drift, diffusion and geometry. For this purpose, we examine different sources of "diffusion models", in physics and in mathematics. We observe that diffusion processes may arise from original models either deterministic, or random but where dynamics and noise are clearly delineated. In the end, we get a diffusion process where noise and dynamics ("drift") are generally intimately entangled in a second-order partial differential operator. We focus on the following questions. Are there implicit geometric structures to properly define a diffusion? How are drift/dynamics and diffusion mixed? Are there geometric structures needed to separate drift and diffusion? We stress the importance of recurrent differential geometric structures - connections and Riemannian metrics - needed to properly define a "diffusion term" and also to separate drift from diffusion.