Generalized principal eigenvalues and global survival of branching Markov processes

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Generalized principal eigenvalues and global survival of branching Markov processes

Seminario de Probabilidad y Procesos Estocásticos

Pascal Maillard

Institut de Mathématiques de Toulouse

11 JUN 2025

17:00 h.

Auditorio Alfonso Nápoles Gándara, IMUNAM.

We relate these to several definitions of generalized principle eigenvalues for elliptic operators due to Berestycki and Rossi. In doing so, we extend these notions to fairly general semigroups of linear positive operators. We use this relation to prove new results about the generalized principle eigenvalues, as well as about uniqueness and non-uniqueness of stationary solutions of a generalized FKPP equation. The probabilistic approach through branching processes gives rise to relatively simple and transparent proofs under much more general assumptions, as well as constructions of (counter-) examples to certain conjectures.

Informes: seminarioproba@matem.unam.mx

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Generalized principal eigenvalues and global survival of branching Markov processes

Generalized principal eigenvalues and global survival of branching Markov processes

Pascal Maillard

11 JUN 2025

17:00 h.

Auditorio Alfonso Nápoles Gándara, IMUNAM.

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