# AMPL: How to code an equilibrium constraint?

I am trying to code a Maximum Likelihood Estimation problem using AMPL and am unsure as to how to code the constraint EQC. I am unsure if I need just one contraint or a system of them (1 for each player). The constraint is a fixed point iteration. I have posted the code below:

``````#A constrained optimization formulation for maximum likelihood estimation
# of a interaction game with Incomplete Information

#SET up  #
param n;
set P := 1..n;  # set of players:
set A := 0..1;  # set of actions: adopt is indexed by 1; not adopt is indexed by 0
param nG;               # number of groups in the data
set G := 1..nG; # G is the set of groups
param x {g in G, i in P};
param d {g in G, i in P};
``````

variables to be solved by the optimizer

``````var alpha >= -100, <= 100;    #alpha  is to be estimated
var beta >= -100, <= 100;      # beta is to be estimated
var p {g in G, i in P} >=0, <=1;  #probability of choosing action A=1, to be estimated
``````

objective function and constraints:

``````maximize Likelihood: sum {g in G, i in P} log(d[g,i]*p[g,i] + (1-d[g,i])*(1-p[g,i]));
subject to EQC {g in G, i in P}: p[g,i] = 1/(1+exp( x[g,i]*alpha + (1/n-1)(sum{g in G, i in P} (p[g,-i]))*beta)) ;

#equilibrium constraint where the probability of taking action A=1 is given by the logit of linear function of alpha,beta,p -> p[g,-i] is probability of A=1 for all other player's excluding i
``````

Thanks very much Stackoverflow

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