21/01/2021, 14:30 — 15:30 — Online
Daniel Hernández Ruipérez, University of Salamanca
Supermoduli of supersymmetric curves with punctures
Review lecture:
We introduce super schemes (super algebraic varieties) and super analytic spaces and their basic properties. We then focus on SUSY curves (supersymmetric Riemann surfaces) without and with NS and RR punctures and construct a supermoduli for them. It has the structure of an Artin algebraic superspace, that is, it is the quotient of an étale equivalence relation of superschemes (superalgebriac varieties). We also report on compactifications of the supermoduli.
See also
Lisboa21_3_ruiperez.pdf