Update test case after fix to math export

Author: mdbenito

tests/hugo/frontmatter.md

@@ -15,7 +15,7 @@ series:
   - "Inter-dimensional travel via portal gun"
 spotlight: true
 subtitle: "with applications to low-dimensional portals"
-summary: "Recent interest in essentially Riemannian, Gauß–Milnor subrings has centered on constructing super-closed, naturally minimal, reversible fields. We show that there exists a prime, finitely surjective and countably Pappus universally Noetherian, co-infinite path equipped with an everywhere minimal measure space. Let $\mathcal{J}^{(\mathscr{M})}$ be a Poincaré, orthogonal, invertible homomorphism. We show that $\pi \lesssim \sin (\|n\|\- z') \mathcal{J}^{(\mathscr{M})}$. In future work, we plan to address questions of measurability as well as maximality as well as characterize normal, super-totally isometric domains."
+summary: "Recent interest in essentially Riemannian, Gauß–Milnor subrings has centered on constructing super-closed, naturally minimal, reversible fields. We show that there exists a prime, finitely surjective and countably Pappus universally Noetherian, co-infinite path equipped with an everywhere minimal measure space. Let $\mathcal{J}^{(\mathscr{M})}$ be a Poincaré, orthogonal, invertible homomorphism. We show that $\pi \lesssim \sin (\|n\|- z') \mathcal{J}^{(\mathscr{M})}$. In future work, we plan to address questions of measurability as well as maximality as well as characterize normal, super-totally isometric domains."
 title: "On the properties of $L^{\infty}$-Gauß-Milnor knots"
 ---