Geometric Structure of PINN Latent Space for Burger's Equation: Low-Dimensional Manifolds and Initial Condition Encoding

Abstract: Understanding how Physics-Informed Neural Networks (PINNs) encode complex physical systems and the influence of parameters like initial conditions within their latent representations is crucial for interpretability and application. This study investigates the geometric structure of the 10-dimensional latent space generated by a PINN solving the 2D Burger's equation across 25 different initial conditions. Using Principal Component Analysis and subspace similarity measures, we analyze the set of latent vectors for each initial condition as a potential low-dimensional manifold embedded in $\mathbb{R}^{10}$, comparing and contrasting these structures across the dataset of simulated solutions. The analysis reveals a highly organized latent space; globally, the latent vectors occupy an effectively 6-dimensional subspace capturing over 99% of variance. For each individual initial condition, the latent vectors form a distinct, approximately 3-dimensional affine manifold, a structure remarkably consistent across all tested conditions. Crucially, the primary effect of changing the initial condition is encoded as a translation of this 3D manifold along a nearly one-dimensional path within the 10-dimensional latent space, strongly aligned with the global principal component. Furthermore, these 3D manifolds are remarkably parallel to each other, exhibiting an average subspace similarity exceeding 0.98, with only subtle, low-dimensional variations in their orientation. These findings demonstrate that the PINN learns a highly structured and efficient parameterization where initial conditions select specific, geometrically simple, and highly related low-dimensional structures within the overall latent space, offering valuable insights into the network's internal encoding mechanisms and suggesting potential avenues for model interpretation and compression.

Subjects:	physics.comp-ph; cs.LG
Cite as:	PX:2508.00069