Improving CACC Robustness to Parametric Uncertainty via Plant Equivalent Controller Realizations

TL;DR

This paper introduces a novel approach to enhance the robustness of Cooperative Adaptive Cruise Control (CACC) systems against vehicle parameter uncertainties by optimizing plant equivalent controller realizations, ensuring stability and improved performance.

Contribution

It proposes a convex optimization framework using plant equivalent controllers to explicitly model and mitigate parametric uncertainties in CACC without redesigning the control law.

Findings

Enhanced robustness under parametric uncertainty

Maintained nominal CACC behavior

Convex optimization approach applicable to heterogeneous platoons

Abstract

Cooperative Adaptive Cruise Control (CACC) enables vehicle platooning through inter-vehicle communication, improving traffic efficiency and safety. Conventional CACC relies on feedback linearization, assuming exact vehicle parameters; however, longitudinal vehicle dynamics are nonlinear and subject to parametric uncertainty. Applying feedback linearization with a nominal model yields imperfect cancellation, leading to model mismatch and degraded performance with off-the-shelf CACC controllers. To improve robustness without redesigning the CACC law, we explicitly model the mismatch between the ideal closed-loop dynamics assumed by the CACC design and the actual dynamics under parametric uncertainties. Robustness is formulated as an $\mathcal{L}_2$ trajectory-matching problem, minimizing the energy of this mismatch to make the uncertain system behave as closely as possible to the ideal model. This objective is addressed by optimizing over plant equivalent controller (PEC) realizations that preserve the nominal closed-loop behavior while mitigating the effects of parametric uncertainty. Stability and performance are enforced via linear matrix inequalities, yielding a convex optimization problem applicable to heterogeneous platoons. Experimental results demonstrate improved robustness and performance under parametric uncertainty while preserving nominal CACC behavior.