Paper List

期刊: ArXiv Preprint
发布日期: 2025-12-01
Computational BiophysicsStructural Biology

Realistic Transition Paths for Large Biomolecular Systems: A Langevin Bridge Approach

Department of Computer Science and Genome Center, University of California, Davis | Architecture et Dynamique des Macromolécules Biologiques, UMR 3528 du CNRS, Institut Pasteur | Department of Physics, School of Sciences, Great Bay University | Université Paris-Saclay, CNRS, CEA, Institut de Physique Théorique

Patrice Koehl, Marc Delarue, Henri Orland
Figure
Figure
Figure
Figure
Figure

30秒速读

IN SHORT: This paper addresses the core challenge of generating physically realistic and computationally efficient transition paths between distinct protein conformations, a problem where existing methods often produce non-physical trajectories due to oversimplified energy surfaces and steric clashes.

核心创新

  • Methodology Introduces SIDE (Stochastic Integro-Differential Equation), a novel Langevin bridge-based framework that efficiently approximates exact bridge equations at low temperatures to generate constrained transition trajectories.
  • Methodology Develops a new coarse-grained potential that combines a Gō-like term (to preserve native backbone geometry) with a Rouse-type elastic energy term (from polymer physics), avoiding the problematic mixing of start/target conformation information used in prior methods like MinActionPath.
  • Theory Provides a rigorous stochastic integro-differential formulation derived from the Langevin bridge formalism, which explicitly constrains trajectories to reach a target state within finite time, moving beyond Minimum Action Path (MAP) principles.

主要结论

  • The SIDE framework generates smooth, low-energy transition trajectories that maintain realistic molecular geometry, as demonstrated on several proteins undergoing large-scale conformational changes.
  • SIDE frequently recovers experimentally supported intermediate states along transition paths, suggesting its paths have biological relevance beyond mere endpoint interpolation.
  • Compared to established methods like MinActionPath and EBDIMS, SIDE offers improved physical realism and computational efficiency for modeling biomolecular conformational transitions, though challenges remain for highly complex motions.
研究空白: While static protein structure prediction is largely solved (e.g., AlphaFold), predicting dynamic conformational transitions remains a major bottleneck. Existing computational methods (e.g., MinActionPath, EBDIMS) often generate non-physical paths due to oversimplified energy surfaces that ignore steric hindrance and produce energy cusps, and there is a severe lack of experimental time-resolved structural data for training data-driven models.

摘要: We introduce a computational framework for generating realistic transition paths between distinct conformations of large biomolecular systems. The method is built on a stochastic integro-differential formulation derived from the Langevin bridge formalism, which constrains molecular trajectories to reach a prescribed final state within a finite time and yields an efficient low-temperature approximation of the exact bridge equation. To obtain physically meaningful protein transitions, we couple this formulation to a new coarse-grained potential combining a Gō-like term that preserves native backbone geometry with a Rouse-type elastic energy term from polymer physics; we refer to the resulting approach as SIDE. We evaluate SIDE on several proteins undergoing large-scale conformational changes and compare its performance with established methods such as MinActionPath and EBDIMS. SIDE generates smooth, low-energy trajectories that maintain molecular geometry and frequently recover experimentally supported intermediate states. Although challenges remain for highly complex motions—largely due to the simplified coarse-grained potential—our results demonstrate that SIDE offers a powerful and computationally efficient strategy for modeling biomolecular conformational transitions.