Asymptotic Betti bounds for hypersurfaces in a singular variety
Abstract: We show that for any degree $d$ hypersurface $Y \subset X$ in a possibly singular projective variety $X \subset \mathbf{P}N$, the total Betti number of $Y$ is bounded by $3\text{deg}(X)\cdot dn + C\cdot d{n-1}$ for some explicit constant $C > 0$ independent of $d$ and $Y$. When $X$ is a local complete intersection, the bound improves to $\text{deg}(X)\cdot dn + C\cdot d{n-1}$. In this case, the bound is asymptotically sharp. Similar bounds are also established for general constructible sheaves.
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