[cmath] JSC Special Issue "Algebraic Geometry and Machine Learning"

[Ilias Kotsireas]

JOURNAL OF SYMBOLIC COMPUTATION
https://www.journals.elsevier.com/journal-of-symbolic-computation
SPECIAL ISSUE on "Algebraic Geometry and Machine Learning"

CALL FOR PAPERS

Guest Editors:

Jonathan Hauenstein
University of Notre Dame, USA

Yang-Hui He
City, University of London and
University of Oxford, UK

Ilias Kotsireas
Wilfrid Laurier University, Canada

Dhagash Mehta
The Vanguard Group, USA

Tingting Tang
San Diego State University Imperial Valley Campus, USA

Important Dates:

Submission deadline: May 30, 2021
Author notification: November 2021
Camera ready: December 2021

Machine learning research, both from applied and theoretical
sides, has exploded in the recent years. In the last few years,
algebraic geometry techniques have also been rapidly progressing
due to novel mathematical results as well as sophisticated
symbolic and numerical methods which can solve various
algebraic geometry problems with ever increasing complexities.
Many machine learning problems, for example, exploring
optimization landscapes of deep learning and training various
machine learning algorithms, can be seen as algebraic geometry
problems. A general theoretical question of machine learning,
particularly, deep learning, is explainability and interpretability of
the model and results it produces. Research efforts have been
invested into the theoretical understanding of machine learning
(“Explainable Artificial Intelligence” (XAI) from DARPA and the
“American AI Initiative”). Some of the recent research papers
address these theoretical issues in a unique and rigorous way
using algebraic geometry methods. Interestingly, various
computational algebraic geometry problems can be posed and
solved with machine learning.
On the other end, machine learning has been successfully
employed to solve problems arising in both theoretical and
computational algebraic geometry: machine learning has been
shown to improve algorithms (both symbolic and numerical) to
solve polynomial systems, approximate algebraic varieties and
discriminant loci, as well as applications to the landscape of
algebraic varieties of interest to theoretical physics, especially
string theory etc. The neural networks in particular provide a
novel representation of the data which may help symbolic as well
as numerical computation further.
The literature on this emerging interaction of the two disciplines
is scattered. In the proposed special issue, we aim to bring
researchers from both the areas together and provide a serious
peer-reviewed platform to present their interdisciplinary research.
To the best of our knowledge this will be a first ever special issue
on this topic.

Paper Submission:

Papers should be submitted exclusively via EES (Elsevier Editorial System) at:
https://www.editorialmanager.com/jsco/
Please indicate that your submission is intended for the special issue "AG and 
ML"