On a construction of Burago and Zalgaller

Abstract

The purpose of this note is to scrutinize the proof of Burago and Zalgaller regarding the existence of PL isometric embeddings of PL compact surfaces into R3. We conclude that their proof does not admit a direct extension to higher dimensions. Moreover, we show that, in general, PL manifolds of dimension n ≥ 3 admit no nontrivial PL embeddings in Rn+1 that are close to conformality. We also extend the result of Burago and Zalgaller to a large class of noncompact PL 2-manifolds. The relation between intrinsic and extrinsic curvatures is also examined, and we propose a PL version of the Gauss compatibility equation for smooth surfaces.