In this paper we consider a target-guarding differential game where the
defender must protect a linearly translating line-segment by intercepting an
attacker who tries to reach it. In contrast to common target-guarding problems,
we assume that the defender is attached to the target and moves along with it.
This assumption affects the defenders' maximum speed in inertial frame, which
depends on the target's direction of motion. Zero-sum differential game of
degree for both the attacker-win and defender-win scenarios are studied, where
the payoff is defined to be the distance between the two agents at the time of
game termination. We derive the equilibrium strategies and the Value function
by leveraging the solution for the infinite-length target scenario. The
zero-level set of this Value function provides the barrier surface that divides
the state space into defender-win and attacker-win regions. We present
simulation results to demonstrate the theoretical results.Comment: 8 pages, 8 figures. arXiv admin note: text overlap with
arXiv:2207.0409