Talk:Moduli stack of elliptic curves

Todo

Include GIT construction (find better substitute of https://arxiv.org/pdf/1111.3032.pdf)
Arithmetic Moduli of Elliptic Curves. (AM-108) is the authoritative reference
Mumford 129-139 contains construction for all abelian varieties, special this for elliptic curves
Mumford GIT page 192 gives ${\mathcal {A}}_{1,(4,8)}$ isomorphic to $x^{4}=y^{4}+z^{4}$ minus twelve points (abelian varieties with level (4,8) structure)
Silverman also discusses weierstrauss equations over Z
https://www.math.ucla.edu/~mikehill/Research/surv-douglas2-201.pdf page 51 is an excellent reference for visualization
Weighted projective space (https://arxiv.org/pdf/1604.02441.pdf)
https://people.math.umass.edu/~tevelev/66-80.pdf and https://people.math.umass.edu/~tevelev/moduli797.pdf are excellent resources and contain more info, especially with the schotky problem

Add compactification + line bundles over compactification + modular forms as modular functions extending to the compactification

Need Artin's criterion article to be updated.
Starting at page 59 of pdf of Deligne Rappoport gives construction using Artin's criterion - http://smtp.math.uni-bonn.de/ag/alggeom/preprints/Lesschemas.pdf
Definition of ${\mathcal {M}}$ is given on pdf page 54
scheme of curves - pdf page 18
generalized scheme of elliptic curves - pdf page 36 definition 1.12