## Overview

Artan Sheshmani is an Associate Professor of Pure Mathematics at Center for Mathematical Sciences and Applications at Harvard University and jointly European Center for Quantum Geometry of Moduli spaces (QGM). His research is focused on Gromov Witten/Donaldson Thomas theory, Calabi-Yau geometries and mathematical aspects of String theory. He mainly makes use of Algebraic Geometry techniques, such as Intersection theory and Derived Category theory for his research. Some times however, Representaion theory, Topology, Differential Geometry and Number Theory might also be employed to carry out the relevant computations. Recently together with collaborators, Artan has focused on proving modularity property of Donaldson-Thomas invariants of Calabi-Yau threefolds (specially general complete intersections). This property is predicted in a famous conjecture of String theory called S-duality conjecture and together with collaborators he has so far proved many cases of it, using Degenerations and Localizations, as well as Wallcrossing techniques. Artan recieved his PhD and Master's degrees in pure mathematics under Sheldon Katz and Thomas Nevins from the University of Illinois at Urbana Champaign (USA) in 2011 and 2008 respectively, and he holds a Master's degree in Solid Mechanics (2004) and two Bachelor's degrees, in Mechanical Engineering and Civil Engineering from the Sharif University of Technology,