Let $k \geq 3$ be a (large enough) integer, let $x \in \mathbb{R}$, and set $I_x := [x, x + \log^k x]$.
Some believe that for $x$ large enough there exists a prime $n \in I_x$. Equivalently, there exists (for large enough $x$) an $n \in I_x$ with $\omega(n) = 1$ where $\omega(n)$ is the number of distinct prime factors of $n$. This seems to be out of reach for the moment.
What (upper) bound can be proved (even assuming big conjetures like GRH or ABC) on $$\min \ \{\omega(n) \ | \ n \in I_x \}$$ for large enough values of $x$?
The (very weak) bound that I managed to obtain is: $C(k)\frac{\log x}{\log \log x}$ where $C(k)$ is approximately (an absolute constant times) $1/k$. This improves upon the trivial upper bound $O(\frac{\log x}{\log \log x})$. I am therefore eager to know if a bound of the form $o(\frac{\log x}{\log \log x})$ can be established.
For (substantially) longer intervals, the Erdos-Kac theorem holds, so much better bounds are available.
I am not interested in results about almost all values of $x$, or about averaging over $x$.
