Contraction property of differential operator on Fock space

TL;DR

This paper establishes a sharp inequality involving derivatives of functions in Fock space, extending previous results and demonstrating the contraction property of a differential operator on this space.

Contribution

The paper introduces a new sharp inequality for derivatives in Fock space, generalizing prior Faber-Krahn inequalities and exploring the contraction property of differential operators.

Findings

Proved a sharp inequality for derivatives in Fock space involving Laguerre polynomials.

Extended the Faber-Krahn inequality to higher derivatives with explicit bounds.

Demonstrated the contraction property of a differential operator on Fock space.

Abstract

In the recent paper, \cite{tilli} Nicola and Tilli proved the Faber-Krahn inequality, which for $p=2$, states the following. If $f\in\mathcal{F}_\alpha^2$ is an entire function from the corresponding Fock space, then $$\frac{1}{\pi}\int_{\Omega} |f(z)|^2 e^{-\pi |z|^2} dx dy \le (1-e^{-|\Omega|}) \|f\|^2_{2,\pi}.$$ Here $\Omega$ is a domain in the complex plane and $|\Omega|$ is its Lebesgue measure. This inequality is sharp and equality can be attained. We prove the following sharp inequality $$\int_{\Omega} \frac{|f^{(n)}(z)|^2e^{-\pi |z|^2}}{\pi^n n ! L_n(-\pi |z|^2)}dxdy \le (1-e^{-(n+1)|\Omega|})\|f\|^2_{2,\pi},$$ where $L_n$ is Laguerre polynomial, and $n\in\{0,1,2,3,4\} $. For $n=0$ it coincides with the result of Nicola and Tilli.