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My primary research interest is Kähler geometry, which lies at the intersection of complex algebraic and differential geometry. More precisely, my work revolves around the question of existence of canonical metrics, e.g. constant scalar curvature metrics, as well characterising algebraically or analytically the solvability of more broad classes of geometric partial differential equations, including Donaldson's J-equation and other generalised Monge-Ampère equations.
Spring 2024: Differential Equations (Bachelor)
Fall 2024: Advanced Topics in Complex Analysis (Master)
Supervision of Talent Track/Bachelor/Master/PhD students.