SIAM AN 18 Proposed Minisymposia

From SIAG-AG

(Difference between revisions)
Jump to: navigation, search
Revision as of 18:22, 17 January 2018 (edit)
DBrake (Talk | contribs)

← Previous diff
Current revision (06:06, 26 January 2018) (edit) (undo)
DBrake (Talk | contribs)

 
Line 9: Line 9:
'''[[Geometry of Tensors]].''' Organizer: Mateusz Michalek (Max Planck Institute for Mathematics in the Sciences, and Polish Academy of Sciences) and Yang Qi (U Chicago) '''[[Geometry of Tensors]].''' Organizer: Mateusz Michalek (Max Planck Institute for Mathematics in the Sciences, and Polish Academy of Sciences) and Yang Qi (U Chicago)
-'''[[Numerical Algebraic Geometry]].''' Organizer: Dani Brake (UWEC)+'''[[2018 Minisymposium on Numerical Algebraic Geometry]].''' Organizer: Dani Brake (UWEC)
'''[[Optimization Theory and Algebraic Geometry]].''' Organizer: Gabor Pataki (UNC) '''[[Optimization Theory and Algebraic Geometry]].''' Organizer: Gabor Pataki (UNC)
'''[[Theoretical Challenges in Tensor Decomposition]].''' Organizer: Elina Robeva (MIT) and Anna Seigal (UC Berkeley) '''[[Theoretical Challenges in Tensor Decomposition]].''' Organizer: Elina Robeva (MIT) and Anna Seigal (UC Berkeley)

Current revision

January 22, 2018: Minisymposium Proposal Submission Deadline Extended

January 31, 2018: Minisymposium Presentation Abstract Deadline

Algebraic Geometry meets Numerical Differential Geometry. Organizer: Tingran Gao (U Chicago) and Jose Israel Rodriguez (U Chicago)

Algebraic Statistics. Organizer: Carlos Amendola (TU Munich), Elizabeth Gross (San Jose State U), and Jose Israel Rodriguez (U Chicago)

Geometry of Tensors. Organizer: Mateusz Michalek (Max Planck Institute for Mathematics in the Sciences, and Polish Academy of Sciences) and Yang Qi (U Chicago)

2018 Minisymposium on Numerical Algebraic Geometry. Organizer: Dani Brake (UWEC)

Optimization Theory and Algebraic Geometry. Organizer: Gabor Pataki (UNC)

Theoretical Challenges in Tensor Decomposition. Organizer: Elina Robeva (MIT) and Anna Seigal (UC Berkeley)

Views
Personal tools