The topic of Gr\"{o}bner bases lies in the intersection of commutative algebra, algebraic geometry, combinatorics, and symbolic computation. The goal of this special session is to bring together researchers from various backgrounds whose work has involved either theoretical or applied aspects of the subject. Specific topics to be discussed in this section may include Gr\"{o}bner degeneration, toric varieties, Schubert varieties, determinantal varieties, syzygies and vector bundles, computational aspects, software for Gr\"{o}bner bases, sagbi bases, tropical bases, and applications to optimization or statistics.
Further details will be posted here as they become available. Or you may contact the organizers Alexander Yong and Bernd Sturmfels .
Here are the titles, abstracts and schedule.
Giulio Cavaglia (UC Berkeley)
David Eisenbud (UC Berkeley)
Serkan Hosten (San Francisco State University)
Allen Knutson (UC San Diego)
JM Landsberg (Texas A+M)
Anton Leykin (U. Illinios, Chicago)
Diane Maclagan (Rutgers University)
Sorin Popescu (SUNY, Stony Brook)
Edwin O'Shea (U. Washington)
Greg Smith (Queen's University)
Bernd Sturmfels (UC Berkeley)
Alexander Woo (UC Davis)
Alexander Yong (U. Minnesota/Fields Institute)