I wonder whether $\sum_{k=0}^n \exp(r_k z)$ has a complex zero for any $n\in \mathbb{Z}_n^*,0=r_0<r_1<r_2<\dotsb<r_n$. I think the answer is affirmative.
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2$\begingroup$ Not for $n=0$, no. $\endgroup$– Gerry MyersonCommented Jul 4, 2022 at 0:55
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2 Answers
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An affirmative answer follows from (9) in this paper by Ritt.
answered Jul 3, 2022 at 19:24
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A simpler proof can be obtained as follows. Proving by contradiction, suppose it has no zeros. Since this is an entire function of order one, it must be $\exp(az+b)$. So we have the identity $$\sum_{k=0}^n e^{r_kz}=e^{az+b},$$ where all $r_k$ are distinct. If $a\not\in\{ r_k\}$, this gives a linear dependence of $n+2$ exponential functions. If $a\in\{ r_k\}$, this gives a linear dependence of $n+1$ exponential functions. But it is well-known and easy to prove (using Wronskian determinant) that exponential functions with distinct exponents are linearly independent.
Remark. A little more work shows that in fact such a sum has infinitely many zeros, moreover the sequence of zeros has non-zero density: the number of zeros in disks $|z|\leq r$ is at least $cr$ for some $c>0$.
answered Jul 4, 2022 at 5:39
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