Our papers are the official record of our discoveries. They allow others to build on and apply our work. Each one is the result of many months of research, so we make a special effort to make our papers clear, inspiring and beautiful, and publish them in leading journals.
- Date
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- Theme
- Journal
- Citations
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- Author
O. Gamayun
A. Esterov
Y. He
A. V. Kosyak
A. Ochirov
E. Sobko
M. Burtsev
M. Reeves
I. Shkredov
T. Fink
F. Sheldon
G. Caldarelli
R. Hannam
F. Caravelli
A. Coolen
O. Dahlsten
A. Mozeika
M. Bardoscia
P. Barucca
M. Rowley
I. Teimouri
F. Antenucci
A. Scala
R. Farr
A. Zegarac
S. Sebastio
B. Bollobás
F. Lafond
D. Farmer
C. Pickard
T. Reeves
J. Blundell
A. Gallagher
M. Przykucki
P. Smith
L. Pietronero
Algebraic geometry
Schön complete intersections
Describing a uniform approach to a class of varieties which includes important types of objects from geometry, optimisation and physics.
Algebraic geometry
Slight degenerations
Investigating the geometry of a system of sparse polynomial equations, beyond the classical genericity assumption on their coefficients.
Algebraic geometry
Sparse curve singularities
Generic singularities of both the resultants of sparse polynomials and the curve projections given by sparse polynomials are described.
Permuting the roots
Using topology of braids and tropical geometry to describe the Galois group of a typical rational function and solve other similar problems.
Algebraic geometry
Symmetric spatial curves
We study the geometry of generic spatial curves with a symmetry in order to understand the Galois group of a family of sparse polynomials.