| Sadly not an expert in that area. I only took a course of Nuclear Physics for a Major in Physics [1]. So I can read and understand that stuff, but the fine details pass over my head. Looking at a recent page of that course, the recomended books are * F. Halzen, A. Martin, “Quarks and Leptons: An introductory course in modern particle physics” (Wiley 1984) * D. Griffiths, “Introduction to elementary particles” (Wiley 1987) (and a few more) The calculation for g=2 is quite easy (for an advanced Physics student). I remember the general idea, but not the details. I think I can reconstruct the details if necessary. It may be explainable in a blog post skipping some details. The first correction g=2+1/137.036 is also humanly compresible, and can also be explained with some graphics. It would be very hard for me, but if I have a week to seach and rehearsal it is possible. As the sibling comment says, the following corrections g=2+1/137.036+g=2+?/137.036^2 get harder and harder. And there are too many technical details and problems. I can only see the graphics and get a shallow understanding, but how they are transformed to integral and how to calculate all of them efficiently is too much for my knowledge. [1] I never finished my Major in Physics, but I finished the one in Math. |
It is telling that for a recent course the recommended books are over 35 years old. Consistent with the OP proposition.