Permutation-Symmetrized Diffusion for Unconditional Molecular Generation
This work addresses the challenge of permutation invariance in molecular generation for computational chemistry, presenting an incremental improvement over existing methods.
The paper tackled the problem of enforcing permutation invariance in molecular point-cloud generation by modeling diffusion directly on a quotient manifold that identifies all atom permutations, resulting in competitive generation quality with improved efficiency on the QM9 dataset.
Permutation invariance is fundamental in molecular point-cloud generation, yet most diffusion models enforce it indirectly via permutation-equivariant networks on an ordered space. We propose to model diffusion directly on the quotient manifold $\tilde{\calX}=\sR^{d\times N}/S_N$, where all atom permutations are identified. We show that the heat kernel on $\tilde{\calX}$ admits an explicit expression as a sum of Euclidean heat kernels over permutations, which clarifies how diffusion on the quotient differs from ordered-particle diffusion. Training requires a permutation-symmetrized score involving an intractable sum over $S_N$; we derive an expectation form over a posterior on permutations and approximate it using MCMC in permutation space. We evaluate on unconditional 3D molecule generation on QM9 under the EQGAT-Diff protocol, using SemlaFlow-style backbone and treating all variables continuously. The results demonstrate that quotient-based permutation symmetrization is practical and yields competitive generation quality with improved efficiency.