Quantum Marginal Problem: mathematics, physics and computational algorithms 1/4

This project address the so-called Quantum Marginal Problem from a mathematical, physics and computational perspective. It develops the mathematical theory of optimal transport adapt to quantum states in order to make fundamental advances in physical aspects and computational algorithms solving the quantum marginal problem.

Faculty Supervisor:

Augusto Gerolin;Stefanie Czischek;Anne Broadbent

Student:

Partner:

National University of Kharkiv

Discipline:

Mathematics

Sector:

Quantum Science; Information and Communications Technology (ICT); Artificial Intelligence

University:

University of Ottawa

Program:

Globalink Research Award

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