群等变庞加莱卷积网络 / Group-Equivariant Poincaré Convolutional Networks
1️⃣ 一句话总结
该研究通过将双曲几何与离散对称群(如旋转和反射)相结合,提出了一种能在庞加莱球面上保持空间变换等变性的新型残差网络,从而解决了传统双曲网络训练慢、参数冗余和信号消失等关键问题。
While recent advancements like the Poincaré ResNet have demonstrated the potential of learning visual representations directly in hyperbolic space, their optimisation remains hampered by the computationally intensive nature of Riemannian gradients and the strict boundaries of the manifold. Furthermore, standard hyperbolic networks treat spatial transformations of the same object as distinct hierarchical concepts, leading to redundant parameter usage and vanishing signals. We propose Equivariant Poincaré ResNets, combining hyperbolic geometry with discrete symmetry groups ($C_4$ and $D_4$). We identify critical roadblocks in applying Euclidean equivariance to hyperbolic space and propose geometrically safe tensor reshaping, left-regular permutations for hyperbolic group convolutions, and joint-orientation Poincaré Midpoint Batch normalisation. Empirically, embedding equivariance drastically reduces the optimisation space, accelerating convergence while accelerating convergence while respecting the boundary constraints of the Poincaré ball and preserving spatial-group equivariance.
群等变庞加莱卷积网络 / Group-Equivariant Poincaré Convolutional Networks
该研究通过将双曲几何与离散对称群(如旋转和反射)相结合,提出了一种能在庞加莱球面上保持空间变换等变性的新型残差网络,从而解决了传统双曲网络训练慢、参数冗余和信号消失等关键问题。
源自 arXiv: 2607.00556