Asymptotic Behavior of Critical Primitive Multi-Type Branching Processes with Immigration

• Published in: Stochastic analysis and applications Vol. 32; no. 5; pp. 727 - 741
• Main Authors: Ispány, Márton, Pap, Gyula
• Format: Journal Article
• Language: English
• Published: Taylor & Francis 03.09.2014
• Subjects: Approximation; Asymptotic properties; Critical primitive multi-type branching processes with immigration; Diffusion; Mathematical analysis; Primary: 60J80; Secondary: 60J60; Squared Bessel processes; Step functions; Stochasticity; Vectors (mathematics)
• ISSN: 0736-2994; 1532-9356
• DOI: 10.1080/07362994.2014.939542

Under natural assumptions a Feller-type diffusion approximation is derived for critical multi-type branching processes with immigration when the offspring mean matrix is primitive (in other words, positively regular). Namely, it is proved that a sequence of appropriately scaled random step functions formed from a sequence of critical primitive multi-type branching processes with immigration converges weakly toward a squared Bessel process supported by a ray determined by the Perron vector of the offspring mean matrix.