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Application deadline: March 15, 2026
The theory of perverse schobers represents a profound advancement in higher categorical geometry and representation theory. A perverse schober is a categorification of the classical notion of a perverse sheaf, replacing sheaves of vector spaces with sheaves of categories. This framework provides a powerful tool for studying moduli problems and categorical structures in algebraic and symplectic geometry.
The study of perverse sheaves, perverse schobers, and their interplay with geometry, algebra, and representation theory is currently an extremely vibrant and promising area of research. The aim of this Summer School is to introduce graduate students working in Algebraic Geometry, Representation Theory, or Topology to perverse sheaves and their categorification (perverse schobers), and some of their recent important applications.
Suitable for: PhD students, early postdoctoral fellows and junior researchers, working in areas related to Algebraic Geometry, Representation Theory, and Topology.
For further information visit our website or send an email to summerschools@univiu.org
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