<?xml version="1.0" encoding="UTF-8"?>
<!-- generator="wordpress.com" -->
<urlset xmlns:xsi="http://www.w3.org/2001/XMLSchema-instance"
	xsi:schemaLocation="http://www.sitemaps.org/schemas/sitemap/0.9 http://www.sitemaps.org/schemas/sitemap/0.9/sitemap.xsd"
	xmlns="http://www.sitemaps.org/schemas/sitemap/0.9"
	xmlns:news="http://www.google.com/schemas/sitemap-news/0.9"
	xmlns:image="http://www.google.com/schemas/sitemap-image/1.1"
	>
<url><loc>https://appliedprobability.blog/2026/07/11/m-g-%e2%88%9e-queue-and-campbells-theorem/</loc><news:news><news:publication><news:name>Applied Probability Notes</news:name><news:language>en</news:language></news:publication><news:publication_date>2026-07-11T10:15:03+00:00</news:publication_date><news:title>M/G/∞ Queue and Campbell&#8217;s Theorem</news:title></news:news></url><url><loc>https://appliedprobability.blog/2026/07/11/kingmans-bound/</loc><news:news><news:publication><news:name>Applied Probability Notes</news:name><news:language>en</news:language></news:publication><news:publication_date>2026-07-11T10:00:54+00:00</news:publication_date><news:title>Kingman&#8217;s Bound</news:title></news:news></url><url><loc>https://appliedprobability.blog/2026/07/10/lindleys-recursion-and-the-g-g-1-queue/</loc><news:news><news:publication><news:name>Applied Probability Notes</news:name><news:language>en</news:language></news:publication><news:publication_date>2026-07-10T20:47:04+00:00</news:publication_date><news:title>Lindley&#8217;s Recursion and the G/G/1 Queue</news:title></news:news></url><url><loc>https://appliedprobability.blog/2026/07/10/a-server-with-general-service-the-m-g-1-queue/</loc><news:news><news:publication><news:name>Applied Probability Notes</news:name><news:language>en</news:language></news:publication><news:publication_date>2026-07-10T20:32:52+00:00</news:publication_date><news:title>A Server with General Service: The M/G/1 Queue</news:title></news:news></url><url><loc>https://appliedprobability.blog/2026/07/10/renewal-processes-and-residual-service/</loc><news:news><news:publication><news:name>Applied Probability Notes</news:name><news:language>en</news:language></news:publication><news:publication_date>2026-07-10T20:14:25+00:00</news:publication_date><news:title>Renewal Processes and Residual Service</news:title></news:news></url><url><loc>https://appliedprobability.blog/2026/07/10/erlang-link-and-the-infinite-server-queue/</loc><news:news><news:publication><news:name>Applied Probability Notes</news:name><news:language>en</news:language></news:publication><news:publication_date>2026-07-10T19:49:57+00:00</news:publication_date><news:title>Erlang Link and The Infinite Server Queue</news:title></news:news></url><url><loc>https://appliedprobability.blog/2026/07/10/a-call-centre-queue-m-m-n/</loc><news:news><news:publication><news:name>Applied Probability Notes</news:name><news:language>en</news:language></news:publication><news:publication_date>2026-07-10T19:35:41+00:00</news:publication_date><news:title>A Call Centre Queue (M/M/N)</news:title></news:news></url><url><loc>https://appliedprobability.blog/2026/07/10/littles-law-2/</loc><news:news><news:publication><news:name>Applied Probability Notes</news:name><news:language>en</news:language></news:publication><news:publication_date>2026-07-10T19:27:59+00:00</news:publication_date><news:title>Little&#8217;s Law</news:title></news:news></url></urlset>
