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Full-Text Articles in Physical Sciences and Mathematics
Obstruction Criteria For Modular Deformation Problems, Jeffrey Hatley Jr
Obstruction Criteria For Modular Deformation Problems, Jeffrey Hatley Jr
Doctoral Dissertations
For a cuspidal newform f of weight k at least 3 and a prime p of the associated number field Kf, the deformation problem for its associated mod p Galois representation is unobstructed for all primes outside some finite set. Previous results gave an explicit bound on this finite set for f of squarefree level; we modify this bound and remove the squarefree hypothesis. We also show that if the p-adic deformation problem for f is unobstructed, then f is not congruent mod p to a newform of lower level.
Motivic Integration Over Nilpotent Structures, Andrew Ryan Stout
Motivic Integration Over Nilpotent Structures, Andrew Ryan Stout
Dissertations, Theses, and Capstone Projects
This thesis concerns developing the notion of Motivic Integration in such a way that it captures infinitesimal information yet reduces to the classical notion of motivic integration for reduced schemes. Moreover, I extend the notion of Motivic Integration from a discrete valuation ring to any complete Noetherian ring with residue field $\kappa$, where $\kappa$ is any field. Schoutens' functorial approach (as opposed to the traditional model theoretic approach) allows for some very general notions of motivic integration. However, the central focus is on using this general framework to study generically smooth schemes, then non-reduced schemes, and then, finally, formal schemes. …
Boundary Divisors In The Moduli Space Of Stable Quintic Surfaces, Julie Rana
Boundary Divisors In The Moduli Space Of Stable Quintic Surfaces, Julie Rana
Doctoral Dissertations
I give a bound on which singularities may appear on KSBA stable surfaces for a wide range of topological invariants, and use this result to describe all stable numerical quintic surfaces, i.e. stable surfaces with K^2= 5, p_g=4, and q=0, whose unique non Du Val singularity is a Wahl singularity. Quintic surfaces are the simplest examples of surfaces of general type and the question of describing their moduli is a long-standing question in algebraic geometry. I then extend the deformation theory of Horikawa to the log setting in order to describe the boundary divisor of the moduli space of KSBA …