David Witt Nyström
About David Witt Nyström
My field of research is complex geometry. I have done work on Fekete points, Okounkov bodies, geodesic rays in spaces of Kähler metrics, canonical tubular neighbourhoods in Kähler geometry and Hele-Shaw flows and their connection to the complex homogeneous Monge-Ampere equation. My latest research focuses on embeddings of Kähler balls into projective manifolds.
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Minimum Principle for Convex
Subequations
J. Ross, David Witt Nyström
Journal of Geometric Analysis - 2022 -
Non-pluripolar energy and the complex Monge-Ampere
operator
Mats Andersson, David Witt Nyström, Elizabeth Wulcan
Journal Fur Die Reine Und Angewandte Mathematik - 2022 -
Differentiability of the Argmin Function and a Minimum Principle for Semiconcave
Subsolutions
J. Ross, David Witt Nyström
Journal of Convex Analysis - 2020 -
Coupled Kähler-Einstein
Metrics
Jakob Hultgren, David Witt Nyström
International mathematics research notices - 2019 -
ON THE MAXIMAL RANK PROBLEM FOR THE COMPLEX HOMOGENEOUS MONGE-AMPERE
EQUATION
J. Ross, David Witt Nyström
Analysis & Pde - 2019 -
DUALITY BETWEEN THE PSEUDOEFFECTIVE AND THE MOVABLE CONE ON A PROJECTIVE
MANIFOLD
David Witt Nyström, S. Boucksom
Journal of the American Mathematical Society - 2019 -
Analytic test configurations and geodesic
rays
J. Ross, David Witt Nyström
The Journal of Symplectic Geometry - 2014 -
Okounkov bodies and geodesic rays in Kähler
geoemtry
David Witt Nyström
2012 -
Test configurations and Okounkov
bodies
David Witt Nyström
Compositio Mathematica - 2012 -
Fekete points and convergence towards equilibrium measures on complex
manifolds
Robert Berman, Sebastien Boucksom, David Witt Nyström
Acta Mathematica - 2011 -
Transforming metrics on a line bundle to the Okounkov
body
David Witt Nyström
2009 -
Chebyshev transforms on Okounkov
bodies
David Witt Nyström
2009 -
Convergence of Bergman measures of high powers of a line
bundle
Robert Berman, David Witt Nyström
2008