Variations on a theorem of Beurling (Q2515418)

The authors consider functions \(f\) satisfying the subcritical Beurling's condition \[ K_{a}(f)=\int_{\mathbb{R}^n}\int_{\mathbb{R}^n}|f(x)||\hat{f}(y)|e^{a|x\cdot y|}\;dxdy <\infty \] for some \(0< a< 1\). The authors show that such functions are entire vectors for the Schrödinger representations of the Heisenberg group \(\mathbb{H}^n\). If an eigenfunction \(f\) of the Fourier transform satisfies the above condition \(K_{a}(f)< \infty\), they show that the Hermite coefficients of \(f\) have certain exponential decay depending only on \(a\).