A naive integral (2407.05719v1)

Abstract: In arXiv:2406.0243 two real functions $g(x,t)$ and $f(x,t)$ are defined, so that the Riemann-Siegel $Z$ function is given as [Z(t)=\mathop{\mathrm{Re}}\Bigl{\frac{u(t)e^{\frac{\pi i}{8}}}{\frac12+it}\int_0^\infty g(x,t)e^{i f(x,t)}\,dt\Bigr},] where $u(t)$ is a real function of order $t^{-1/4}$ when $t\to+\infty$. The function $g(x,t)$ is indefinitely differentiable and tends to $0$ as well as all its derivatives when $x\to0^+$ or $x\to+\infty$. Since, furthermore, for $t\to+\infty$ the function $f(x,t)$ tends to $+\infty$ we may expect that the integral depends essentially on the behavior of $g(x,t)$ at the extremes. As Polya in an analogous situation we consider the substitution of $\psi(x)$ by a simpler similar function. A simple function with this behavior is [\psi_0(x):=2\pi(1+\tfrac{1}{4}x^{-5/2})e^{-\pi x-\frac{\pi}{4x}}.] Therefore, we define $J_0(t)$ replacing in the definition of $J(t)$ the function $\psi(x)$ by the simpler $\psi_0(x)$. \begin{equation} J_0(t)=2\pi\int_0^\infty (1+\tfrac{1}{4}x^{-\frac52})e^{-\pi x-\frac{\pi}{4x}}(1-ix)^{\frac12(\frac12+it)}\,dx. \end{equation} The resulting $Z_0(t)$ disappoints us [Z_0(t)\asymp \mathop{\mathrm{Re}}\Bigl{\frac{2}{\sqrt{\pi}}\exp\Bigl{i\Bigl(\frac{t}{2}\log\frac{t}{2\pi}-\frac{t}{2}-\frac{\pi}{8}\Bigr)\Bigr}+\frac{2}{(2\pi t)^{1/4}}\exp\Bigl(\pi i\sqrt{\frac{t}{2\pi}}\;\Bigr)\Bigr},\quad t\to+\infty.] However, the integral $J_0(t)$ is interesting as a technical challenge. And still we have the possibility to get a better result improving $\psi_0(x)$. This is a preliminary version, and we set it as a challenge: to compute and study this integral.