Let {Xn : n ≥ 0} be a Galton-Watson branching process starting with one particle (i.e., X0 = 1) and offspring distribution
p0 = 1,/6 p1 = 1/3, p2 = 1/3, p3 = 1/6.
Find E(Xn), Var(Xn) and P (Population ever dies out).
Thank you :) I'm lost :(
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Let {Xn : n ≥ 0} be a Galton-Watson branching process starting with one particle (i.e., X0 = 1) and offspring distribution
p0 = 1,/6 p1 = 1/3, p2 = 1/3, p3 = 1/6.
Find E(Xn), Var(Xn) and P (Population ever dies out).
Thank you :) I'm lost :(
Hey sheepyyyyyyyy.
Can you outline what the process is (for those who are not familiar with it like me)?