Learning Embedding of 3D models with Quadric Loss

Research paper by Nitin Agarwal, Sung-eui Yoon, M Gopi

Indexed on: 24 Jun '20Published on: 24 Jul '19Published in: arXiv - Computer Science - Computer Vision and Pattern Recognition


Sharp features such as edges and corners play an important role in the perception of 3D models. In order to capture them better, we propose quadric loss, a point-surface loss function, which minimizes the quadric error between the reconstructed points and the input surface. Computation of Quadric loss is easy, efficient since the quadric matrices can be computed apriori, and is fully differentiable, making quadric loss suitable for training point and mesh based architectures. Through extensive experiments we show the merits and demerits of quadric loss. When combined with Chamfer loss, quadric loss achieves better reconstruction results as compared to any one of them or other point-surface loss functions.