dr hab. Jarosław Buczyński

Wydział Matematyki, Informatyki i Mechaniki


Dyscyplina naukowa:

matematyka

Zainteresowania badawcze:

My main research interests are in the area of Algebraic Geometry. It has relations and overlaps with many other areas of Mathematics and Science, including:


  • Combinatorics,

  • Representation Theory,

  • Differential Geometry,

  • Computational Complexity,

  • Commutative Algebra,

  • Algebraic Topology...


More specifically, the problems I am (or I have been) working on are related to the following notions and topics:

  • secant varieties,

  • Hilbert schemes, multigraded Hilbert schemes

  • ranks of tensors and symmetric tensors (and partially symmetric ones, etc),

  • toric varieties,

  • Mori Dream spaces (MDS) and Cox rings,

  • toric degenerations of Calabi-Yau varieties and K3 surfaces,

  • contact Fano manifolds and LeBrun-Salamon conjecture,

  • complex Legendrian varieties,

  • Hilbert basis of a lattice cone,

  • Tensor network states.


Tools I am using in my research include:

  • homogeneous spaces and varieties with an open orbit (quasi-homogeneous varieties),

  • toric geometry (and more generally, torus actions), and related combinatorics (lattices, cones, fans, polytopes, etc), and related algebra (Cox rings, so multigraded rings, etc),

  • geometry and deformations of minimal rational curves on projective manifolds,

  • computational algebraic geometry tools, such as Magma,
  • ">http://magma.maths.usyd.edu.au/magma/handbook/">Magma,
  • birational geometry,

  • apolarity,

  • cactus varieties and its analogues.


description of research interests:

My main research interests are in the area of Algebraic Geometry. It has relations and overlaps with many other areas of Mathematics and Science, including:


  • Combinatorics,

  • Representation Theory,

  • Differential Geometry,

  • Computational Complexity,

  • Commutative Algebra,

  • Algebraic Topology...


More specifically, the problems I am (or I have been) working on are related to the following notions and topics:

  • secant varieties,

  • Hilbert schemes, multigraded Hilbert schemes

  • ranks of tensors and symmetric tensors (and partially symmetric ones, etc),

  • toric varieties,

  • Mori Dream spaces (MDS) and Cox rings,

  • toric degenerations of Calabi-Yau varieties and K3 surfaces,

  • contact Fano manifolds and LeBrun-Salamon conjecture,

  • complex Legendrian varieties,

  • Hilbert basis of a lattice cone,

  • Tensor network states.


Tools I am using in my research include:

  • homogeneous spaces and varieties with an open orbit (quasi-homogeneous varieties),

  • toric geometry (and more generally, torus actions), and related combinatorics (lattices, cones, fans, polytopes, etc), and related algebra (Cox rings, so multigraded rings, etc),

  • geometry and deformations of minimal rational curves on projective manifolds,

  • computational algebraic geometry tools, such as Magma,
  • ">http://magma.maths.usyd.edu.au/magma/handbook/">Magma,
  • birational geometry,

  • apolarity,

  • cactus varieties and its analogues.


Realizowane projekty:

liczne projekty

research projects implemented:

many different projects

USOSweb

Słowa kluczowe:

secant varieties, contact manifolds, toric geometry

Słowa kluczowe:

secant varieties, contact manifolds, toric geometry

Kontakt:

pokaż


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