A Family of Fano Manifolds Obtained as Linear Sections of the Spinor Tenfold
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Explore the geometric properties of Fano manifolds and K3 surfaces through a detailed mathematical lecture examining low-codimensional sections of the spinor tenfold. Discover how these linear sections of homogeneous spaces generate non-trivial moduli beginning at codimension four, revealing connections to the exceptional complex Lie algebra of type E8, graded Lie algebra theory, and classical Kummer quartic surfaces in three-dimensional projective space. Learn about the extremely rich geometric structure of this mathematical family and its relationships to fundamental concepts in algebraic geometry. Gain insights into advanced topics in real algebraic geometry and birational geometry through this 56-minute presentation delivered at the Centre International de Rencontres Mathématiques during the Jean Morlet Chair thematic meeting.
Syllabus
Laurent Manivel: A family of Fano manifolds obtained as linear sections of the spinor tenfold
Taught by
Centre International de Rencontres Mathématiques