A screening approach to nonparametric inference from the M/G/1 workload

Abstract

We address a long-standing open problem posed by Hansen and Pitts (2006) on nonparametric inference for the service-time distribution in an M/G/1 workload model. We consider an M/G/1 queue with unknown arrival rate λ>0 and service-time distribution B(·), without assuming stability or stationarity. A statistician observes the workload process at discrete times t=0,1,…,n and aims to estimate B(w) at a fixed point w>0. We propose an estimator Bn(w) based solely on the observed workload trajectory. The construction relies on a screening mechanism that extracts conditionally i.i.d. compound Poisson increments from the workload process, thereby reducing the dependent-data problem to a Laplace-transform inversion framework. Under mild regularity assumptions on B(·), i.e., continuous differentiability on [0,∞), twice differentiability at w, and a finite second moment, we establish the bound \[ E|Bn(w)-B(w)| =O\!( nn), n∞. \]This provides the first solution to the Hansen-Pitts problem achieving a parametric L1-risk rate (up to a logarithmic factor), without requiring stationarity, stability, or knowledge of the arrival rate.

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