If $p_1$ and $p_2$ are prime numbers, then either $p_1$ divides $\sum_{i=1}^{p_1-1} i^{p_1p_2-1}$ or $p_2$ divides $\sum_{i=1}^{p_2-1} i^{p_1p_2-1}$?

Question

I feel like it's true as for small cases I couldn't find counterexample.

In general, whether it's true that if we have prime number, $p_{1}, p_{2},\dotsc, p_{k}$ and $n=p_{1}p_{2}p_{3}\dotsb p_{k}$ then at least for one $ i \in\{1, 2, \dotsc, k\}$, $p_i$ divides $1^{n-1} +2^{n-1} + \dotsb + (p_{i}-1) ^{n-1}$? Each prime is greater than or equal to 3.

Answer 1

For a prime $p$, $p$ divides $\sum_{i=1}^{p-1}i^k$ if and only if $p-1$ does not divide $k$.

For completeness, here is a one-line proof: if $k$ is divisible by $p-1$, then all $p-1$ terms are congruent to 1 modulo $p$. Otherwise we induct on $r:=k \pmod {p-1}$ summing up the identity $(x+1)^{r+1}-x^{r+1}=(r+1)x^r+...+1$ over $x=0,1,\ldots,p-1$.

Thus, for two primes you may simply suppose that $p_1<p_2$, then $p_1p_2-1\equiv p_1-1 \pmod{p_2-1}$ is not divisible by $p_2-1$.

Answer 2

By Fedor Petrov's answer and Korselt's criterion, the distinct primes $p_1,\dotsc,p_k$ provide a counterexample to the OP's conjecture if and only if their product $n$ is a Carmichael number. For example, the triple $p_1=3$, $p_2=11$, $p_3=17$ provides a counterexample, because their product $n=561$ is a Carmichael number.