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| type | title | author | url | date | domain | format | status | tags | processed_by | processed_date | claims_extracted | extraction_model | extraction_notes | |||||||
|---|---|---|---|---|---|---|---|---|---|---|---|---|---|---|---|---|---|---|---|---|
| source | Staffing a Service System with Non-Poisson Non-Stationary Arrivals | Ward Whitt et al. (Cambridge Core) | https://www.cambridge.org/core/journals/probability-in-the-engineering-and-informational-sciences/article/abs/staffing-a-service-system-with-nonpoisson-nonstationary-arrivals/0F42FDA80A8B0B197D3D9E0B040A43D2 | 2016-01-01 | internet-finance | paper | processed |
|
rio | 2026-03-11 |
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anthropic/claude-sonnet-4.5 | Operations research paper on staffing under non-Poisson non-stationary arrivals. Extracted two claims on peakedness adjustment and dynamic staffing requirements. Direct application to Teleo pipeline architecture for worker scaling. No entity data (academic paper, no companies/products/decisions). No enrichments (novel theoretical contribution not covered by existing claims). |
Staffing a Service System with Non-Poisson Non-Stationary Arrivals
Extends the square-root staffing formula to handle non-Poisson arrival processes, including non-stationary Cox processes where the arrival rate itself is a stochastic process.
Key Content
- Standard Poisson assumption fails when arrivals are bursty or time-varying
- Introduces "peakedness" — the variance-to-mean ratio of the arrival process — as the key parameter for non-Poisson adjustment
- Modified staffing formula: adjust the square-root safety margin by the peakedness factor
- For bursty arrivals (peakedness > 1), you need MORE safety capacity than Poisson models suggest
- For smooth arrivals (peakedness < 1), you need LESS
- Practical: replacing time-varying arrival rates with constant (average or max) leads to badly under- or over-staffed systems
Relevance to Teleo Pipeline
Our arrival process is highly non-stationary: research dumps are bursty (15 sources at once), futardio launches come in bursts of 20+, while some days are quiet. This is textbook non-Poisson non-stationary. The peakedness parameter captures exactly how bursty our arrivals are and tells us how much extra capacity we need beyond the basic square-root staffing rule.
Key insight: using a constant MAX_WORKERS regardless of current queue state is the worst of both worlds — too many workers during quiet periods (wasted compute), too few during bursts (queue explosion).