The problem of identification of parameters by the distribution of the maximum random variable

Consider I:andom graphs with n labelled vertices in which the edges are chosen independently and with a 6lxed probability p, 0 <p C 1. Let y be a fixed real number, q = 1p, and denote by A the maximum degree. Then

Structures are often characterized by parameters, such as mass and stiffness, that are spatially distributed. Parameter identification of distributed structures is subject to many of the difficulties involved in the modelling problem, and the choice of the model can greatly affect the results of the

We determine the limiting distribution of the maximum vertex degree 2 n in a random triangulation of an n-gon, and show that it is the same as that of the maximum of n independent identically distributed random variables G 2 , where G 2 is the sum of two independent geometric(1Â2) random variables.