research institute of mathematical sciences

kyoto university

office: 501 (north comprehensive education and research building)

e-mail: wandel(at)kurims.kyoto-u.ac.jp

address:

Kitashirakawa Oiwake cho, Sakyo-ku,

Kyoto 606-8502, JAPAN

activities:

upcoming:

09.-11.02.2014: Talk at the 'Workshop on geometry and arithmetic of hyperkaehler manifolds' at Leibniz University, Hannover, Germany

past:

01.12.2014: Talk at the Algebraic Geometry Seminar at Tokyo University

09.12.2014: Talk at the Algebraic Geometry Seminar at Tokyo University of Sciences

21.10.2014: Talk at the 'Kinosaki Algebraic Geometry Symposium', Hyogo

30.08.2014: Talk at the 'Workshop on K3 surfaces and Enriques surfaces' at Asahikawa, Hokkaido

30.06.2014: Talk at the Algebraic Geometry Seminar at Universita degli Studi, Milano

19.06.2014: Talk at the Algebraic Geometry Seminar at Leibniz University Hannover

19.05.2014: Talk at the Algebraic Geometry Seminar at Nagoya University

19.03.2014: Talk at the 'Workshop on Hodge structures, derived categories and related topics' at Osaka University

09.01.2014: Talk at the conference 'Younger generations in Algebraic and Complex geometry III' in Nagasaki

13.12.2013: Talk at the Algebraic Geometry Seminar, Kyoto University

research interests: moduli spaces of sheaves, irreducible symplectic manifolds, automorphisms

publications:

automorphisms of o'grady's manifolds acting trivially on cohomology (with G. Mongardi), preprint, arXiv:1411.0759

induced automorphisms on irreducible symplectic manifolds (with G. Mongardi), preprint, arxiv:1405.5706

tautological sheaves: stability, moduli spaces and restrictions to generalised kummer varieties, preprint, arxiv: 1308.4304

non-natural non-symplectic involutions on symplectic manifolds of K3^{[2]}-type (with H. Ohashi), preprint, arxiv: 1305.6353

stability of tautological bundles on the degree two hilbert scheme of surfaces, preprint, arxiv: 1202.6528, to appear in Nag. Math. J.

my phd thesis: Stability of Tautological Bundles on Hilbert Schemes of Points on a Surface

moduli spaces of stable pairs in Donaldson-Thomas theory, to appear in manuscripta mathematica, arxiv: 1011.3328