Are you planning on attending graduate school? Are you curious on how to prepare for grad school and what resources can help? If so, come and learn about ways to prepare for grad school and resources to help you in grad school all week. Some topics that we’ll be covering
Dissertation Defense for the PhD in Neuroscience for Nooshin Safari Title: The Anatomical Structure of Sex Differences in Trust Propensity Dissertation Chair: Frank Krueger, PhD (SSB/IPN) This dissertation explored the neuroanatomical sex differences in trust behavior towards strangers (TP) measured with the trust game by employing voxel-based morphometry and diffusion
Dissertation Defense for the PhD in Neuroscience for Apoorva Kaushik Dissertation Chair: Frank Krueger, PhD (SSB/IPN) Title: Structural Neural Correlates of Social Networks Abstract: Social networks are vital for human interactions, with the social brain hypothesis positing neocortex size evolved to meet social cognitive demands, yet neural associations remain unclear
Speaker: Mark Burge Title: Prettier Images Abstract Time: Friday, April 19 - 12:30pm – 1:30pm Location: Exploratory Hall, room 4106 and on CAGS zoom link
Candidate: Sydney Monserrate Program: Biology MS Date: FRIday April 19, 2024 Time: 1 :00 PM Place: Zoom For full Thesis Defense Announcement Click Here
Johnson Center room 228, The Office of Undergraduate Education
Are you interested in presenting your research or creative project at a conference? Are you wondering about the experiences of participating in a national conference? Mason students who just came back from the National Conference on Undergraduate Research (NCUR), one of the biggest undergraduate research events of the year, attracting
Speaker: Pelle Steffens,Technische Universität München Title: Differential geometric PDE moduli spaces: derived enhancements, ellipticity and representability. Abstract: All sorts of algebro-geometric moduli spaces (of stable curves, stable sheaves on a CY 3-folds, flat bundles, Higgs bundles...) are best understood as objects in derived geometry. Derived enhancements of classical moduli spaces