Fourier Interpolation and Extremal Problems

ERC (European Research Council)HORIZON-ERCID: 101078782
EC Contribution
€11,580
Consortium Size
1 orgs
Start Year
2023
Summary

In 2006 Cohn and Kumar have conjectured that the A2 lattice is universally optimal, meaning that it has the lowest potential energy among all configurations of the same density for all completely monotone potentials. This conjecture has several very important corollaries. Among other consequences, it is known that it implies a positive solution to the 2D crystallization problem, a major unsolved problem coming from materials science, and it also implies a conjecture on the emergence of the triangular lattice of Abrikosov vortices in the Landau-Ginzburg theory of superconductivity.Recently, the 8 and 24-dimensional cases of the Cohn-Kumar conjecture have been positively resolved using novel interpolation formulas for radial Schwartz functions. This formula recovers a radial function from the data of it and its Fourier transform on a discrete set of radii, and its construction uses classical modular and quasi-modular forms.In this project we will prove a significant generalization of these interpolation formulas with a view towards applications in extremal problems in Fourier analysis. To prove these formulas we will develop new analytic and numerical techniques for solving certain types of functional equations in one complex variable. Finally, based on these proposed interpolation formulas we will give a refinement of the Cohn-Kumar conjecture in dimension 2 and use it to attack the full conjecture in this case.

Consortium (1)

Project Results (6)

Source: CORDIS, the EU research results database.

Publications (5)
Annales Henri Poincare
Annales Henri Poincaré· 2025DOI
De Bièvre, Stephan; Langrenez, Christopher; Radchenko, Danylo
On a Gallai‐type problem and illumination of spiky balls and cap bodies
Mathematika· 2025DOI
Andrii Arman, Andriy Bondarenko, Andriy Prymak, Danylo Radchenko
Sharp Gaussian decay for the one-dimensional harmonic oscillator
Proceedings of the American Mathematical Society· 2025DOI
Radchenko, Danylo; Ramos, João P.G.
Small Volume Bodies of Constant Width
International Mathematics Research Notices· 2025DOI
A Arman, A Bondarenko, F Nazarov, A Prymak, D Radchenko
Convolution identities for divisor sums and modular forms
Proceedings of the National Academy of Sciences· 2024DOI
Ksenia Fedosova; Kim Klinger-Logan; Danylo Radchenko
Other Results (1)
Periodic Reporting for period 1 - FourIntExP (Fourier Interpolation and Extremal Problems)