Relative Navigation and Dynamic Target Tracking for Autonomous Underwater Proximity Operations

TL;DR

This paper introduces a novel motion prior based on Lie groups for estimating target trajectories in underwater proximity operations, improving accuracy with sparse and noisy measurements.

Contribution

It proposes a generalized constant-twist motion prior on Lie groups, enabling consistent trajectory estimation across different representations and sensing modalities.

Findings

Improved relative tracking accuracy over noisy measurements.

Effective trajectory estimation with USBL-only and optical data.

Portability of the method across various Lie group manifolds.

Abstract

Estimating a target's 6-DoF motion in underwater proximity operations is difficult because the chaser lacks target-side proprioception and the available relative observations are sparse, noisy, and often partial (e.g., Ultra-Short Baseline (USBL) positions). Without a motion prior, factor-graph maximum a posteriori estimation is underconstrained: consecutive target states are weakly linked and orientation can drift. We propose a generalized constant-twist motion prior defined on the tangent space of Lie groups that enforces temporally consistent trajectories across all degrees of freedom; in SE(3) it couples translation and rotation in the body frame. We present a ternary factor and derive its closed-form Jacobians based on standard Lie group operations, enabling drop-in use for trajectories on arbitrary Lie groups. We evaluate two deployment modes: (A) an SE(3)-only representation that regularizes orientation even when only position is measured, and (B) a mode with boundary factors that switches the target representation between SE(3) and 3D position while applying the same generalized constant-twist prior across representation changes. Validation on a real-world dynamic docking scenario dataset shows consistent ego-target trajectory estimation through USBL-only and optical relative measurement segments with an improved relative tracking accuracy compared to the noisy measurements to the target. Because the construction relies on standard Lie group primitives, it is portable across state manifolds and sensing modalities.