PIP$^2$ Net: Physics-informed Partition Penalty Deep Operator Network
This work addresses the need for more stable and data-efficient operator learning methods for solving parameterized PDEs, which is incremental as it builds on prior frameworks like POU-PI-DeepONet.
The paper tackled the problem of instability and data inefficiency in operator learning for PDEs by developing PIP^2 Net, which introduces a partition penalty to improve trunk-network coordination, resulting in consistent outperformance over existing methods like DeepONet on three nonlinear PDEs with enhanced accuracy and robustness.
Operator learning has become a powerful tool for accelerating the solution of parameterized partial differential equations (PDEs), enabling rapid prediction of full spatiotemporal fields for new initial conditions or forcing functions. Existing architectures such as DeepONet and the Fourier Neural Operator (FNO) show strong empirical performance but often require large training datasets, lack explicit physical structure, and may suffer from instability in their trunk-network features, where mode imbalance or collapse can hinder accurate operator approximation. Motivated by the stability and locality of classical partition-of-unity (PoU) methods, we investigate PoU-based regularization techniques for operator learning and develop a revised formulation of the existing POU--PI--DeepONet framework. The resulting \emph{P}hysics-\emph{i}nformed \emph{P}artition \emph{P}enalty Deep Operator Network (PIP$^{2}$ Net) introduces a simplified and more principled partition penalty that improved the coordinated trunk outputs that leads to more expressiveness without sacrificing the flexibility of DeepONet. We evaluate PIP$^{2}$ Net on three nonlinear PDEs: the viscous Burgers equation, the Allen--Cahn equation, and a diffusion--reaction system. The results show that it consistently outperforms DeepONet, PI-DeepONet, and POU-DeepONet in prediction accuracy and robustness.