Explore a comprehensive lecture on the mathematical contributions of Udi Hrushovski, delivered by David Marker from the University of Illinois at Chicago. Delve into Hrushovski's work on strongly minimal expansions of algebraically closed fields, differentially closed fields, and other significant areas of model theory. Examine key concepts such as Manin kernels, Vaught's Conjecture for DCF, and applications of Jouanolou's Theorem. Gain insights into the connections between model theory and diophantine geometry, including approaches to the function field Mordell-Lang conjecture. Discover the impact of Hrushovski's research on various aspects of mathematical logic and algebra throughout this 49-minute presentation from the Fields Institute workshop "From Geometric Stability Theory to Tame Geometry."