Let $X$ be a very general hypersurface of degree $d$ in $\mathbb{P}^n.$ Does $X$ contain a smooth surface $S$ with $c_1(T_S)^2>2c_2(T_S)$?
For $d<<\sqrt{n}$ the answer is yes, as $X$ will contain a plane. I'm mainly interested in understanding what happens when $d>>\sqrt{n}$. If the answer is no then this seems likely to be very hard to show. But maybe somebody knows a simple construction of such a $S$?
Some more motivation: Bogomolov-Miyaoka-Yau tells us that (in characteristic $0$) we have $c_1^2\leq 3c_2$ for a surface of nonnegative Kodaira dimension. (I believe smooth ruled surfaces that are not $\mathbb{P}^2$ automatically satisfy $c_1^2\leq 2c_2$ but not BMY, as $c_2$ is negative.) Several natural constructions (e.g. complete intersections, products of curves) give surfaces of general type with $\frac{c_1^2}{c_2}$ close to or equal to $2$, but to the best of my (very limited) knowledge all constructions of general type surfaces with $c_1^2>2c_2$ are rather complicated.
On the other hand, it is a folklore conjecture (see e.g. Conjecture 7.5 in http://arxiv.org/abs/1407.7478v1) that very general hypersurfaces with $d>>\sqrt{n}$ do not contain any rational surfaces. More generally, I'm curious what surfaces one should expect in our hypersurface $X$, and in particular what pairs of numerical invariants $(c_1^2,c_2)$ one should expect.
Finally, this is also motivated by techniques used by Bogomolov to bound rational curves in general type surfaces with $c_1^2>c_2$.
