Algorithms and Implementation in Numerical Algebraic Geometry
From SIAG-AG
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Revision as of 19:28, 29 December 2016
[edit] Overview
The foundation of algebraic geometry is the problem of solving systems of polynomial equations. Numerical methods can be used to perform algebraic geometric computations forming the field of numerical algebraic geometry which continues to advance rapidly. The continuing progress in computer hardware and software has enabled new algorithms and implementations. Examples include irreducible decompositions in multi-projective spaces, and numerical techniques for computing discrete objects such as polytopes. This session will feature recent progress in algorithms and implementations of theoretical advances in numerical algebraic geometry.
[edit] Organizer
Tianran Chen
Auburn University at Montgomery
[edit] Confirmed Speakers
- Nathan Bliss (nbliss2@uic.edu)
University of Illinois at Chicago - Jose Rodriguez (JoIsRo@uchicago.edu)
University of Chicago - Jesse Drendel (jesse.drendel@gmail.com)
Colorado State University - Zeng, Zhonggang
Northeastern Illinois University - Dani Brake
University of Notre Dame - Jeff Sommars (sommars1@uic.edu)
University of Illinois at Chicago - Maggie Regan (mregan9@nd.edu)
University of Notre Dame - Lixing Han
University of Michigan-Flint
