On the extremal functions of second order uncertainty principles: symmetry and symmetry breaking

Abstract

This paper focus on the symmetry and symmetry breaking about the second order Hydrogen Uncertainty Principle. Firstly, by choosing a suitable test function, we give a negative answer to the conjecture presented by Cazacu, Flynn and Lam in [J. Funct. Anal. 283 (2022), Paper No. 109659, 37 pp] for N∈\2,3\, and emphasizing the symmetry breaking phenomenon. Secondly, we obtain a family of sharp weighted second order Hydrogen Uncertainty Principle, and prove the extremal functions are radial, which extends the work of Duong and Nguyen [The sharp second order Caffareli-Kohn-Nirenberg inequality and stability estimates for the sharp second order uncertainty principle, arXiv:2102.01425].