Archives: Research Groups
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Research Groups
Research
Learn moreThe theory of operads and props undergoes a rapid development in recent years; its applications can be seen nowadays almost everywhere – in algebraic topology, in homological algebra, in differential geometry, in non-commutative geometry, in string topology, in deformation theory, in quantisation theory etc. This theory demonstrates a remarkable unity of mathematics.
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Research Groups
Graph complexes in algebra, geometry and physics
Learn moreMembers of the group work on the theory of operads, props and graph complexes which demonstrates a remarkable unity of mathematics and has many applications.
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Research Groups
Derived Algebraic Geometry and its Applications
Learn moreUsing the powerful tool of derived algebraic geometry, we establish connections between structures in representation theory and algebraic geometry.
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Research Groups
Research
Learn moreOur research group studies algebraic varieties and noncommutative algebras, and their invariants, usually with an emphasis on Fano varieties or moduli spaces of sheaves and representations. We often do this through the point-of-view of derived categories, with the goal of understanding their deformation theory, or understanding aspects of (homological) mirror symmetry.
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Research Groups
Geometry through Categories and Noncommutative Algebra
Learn moreWe study algebraic geometry using derived categories and noncommutative algebras, uncovering unexpected connections and understanding complicated phenomena
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