id	author	title	date	pages	extension	mime	words	sentence	flesch	summary	cache	txt
gf06g161m8w	Shih-Kai Chiu	On Calabi-Yau Manifolds with Maximal Volume Growth	2021		.txt	text/plain	257	11	45	Next, we show that if a ddbar-exact Calabi-Yau manifold with maximal volume growth has tangent cone at infinity which splits an Euclidean factor, then the metric is unique under subquadratic perturbation of the Kähler potential. As a first step toward understanding this picture, we construct new Calabi-Yau metrics on C^3 with tangent cone at infinity given by C x A_2, and we show that these metrics are inequivalent in the sense that they are not related by isometries and scalings.	cache/gf06g161m8w.txt	txt/gf06g161m8w.txt