17 pages, 8 figures<br/>We study the finite-horizon continuous-time yield management problem with stationary arrival rates and two customer classes. We consider a class of linear threshold policies proposed by Hodge (2008), in which each online (i.e., less desirable) customer is accepted if and only if the remaining inventory at the customer's arrival time exceeds a threshold that linearly decreases over the selling horizon. Using a discrete-time Markov chain representation of sample paths over inventory-time space, we show that a range of such linear threshold policies achieve uniformly bounded regret. We then generalize this result to analogous policies for the same problem with arbitrarily many customer classes. Numerical simulations demonstrate linear threshold policies' competitiveness with existing heuristics and illustrate the effects of the linear threshold's slope.<br/>

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