A Wiener-Ikehara type theorem and its application to Chebyshev bounds for Beurling primes

We provide a new version of the Wiener-Ikehara theorem where one deduces bounds $$ 0< \liminf_{x\to\infty} \frac{S(x)}{e^{x}}\leq \limsup_{x\to\infty} \frac{S(x)}{e^{x}} <\infty $$ for (in particular) a non-decreasing function $S$ from a mild hypothesis on the boundary behavior of its Laplace transform on a vertical segment containing $s=1$. As an application, we establish new criteria for the validity of Chebyshev bounds for Beurling generalized prime number systems under weaker conditions than were known so far.

💡 Research Summary

The authors present a novel variant of the classical Wiener‑Ikehara theorem that replaces the usual precise asymptotic conclusion (S(x)\sim a e^{x}) with the weaker but still powerful two‑sided bound
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