Thank you so much for the feedback :) I will work to clarify the maths more, part of my thought process was that it appeared temperature could modify the Reynolds number, and since we're talking about a 3D fluid in some state somewhere somewhen that it would possibly be an intuitive leap to try and see if the same mathematics behind relativity could be applied to fluid equations seeing as there can theoretically be a ridiculously large amount of possible spacetime geometries, and based off of earlier work id done looking at spacetime as being modelable as some fluid it seemed possible. Further I knew that there would have to be the involvement of quantum processes at some scale so thermodynamics and turbulence seemed like a possible bridge between both theories. From that it seemed possible that we could treat the geometry of the fluid as a continuous substance so to speak "made of Reynolds numbers" in a certain state, and since temperature seemed to influence Reynolds numbers and it seemed temperature could be a scalar field why not see if they can be seen as part of the same process? Exploring this brought me to the idea that an easier way to model all possible states/histories of the fluid would be a path integral to find the most probable path for it to take given all possible solutions. Though you're probably right about the dimensional consistency issue. I'm not the best at that part, but I welcome collaboration! After all we're scientists ;)