Limiting Distribution of the Rightmost Particle in Catalytic Branching Brownian Motion
Abstract
We study the model of binary branching Brownian motion with spatially-inhomogeneous branching rate β δ0(·), where δ0(·) is the Dirac delta function and β is some positive constant. We show that the distribution of the rightmost particle centred about β2t converges to a mixture of Gumbel distributions according to a martingale limit. Our results form a natural extension to S. Lalley and T. Sellke [6] for the degenerate case of catalytic branching.
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