There's an implementation of Googles' PageRank on wikipedia:

``````% Parameter M adjacency matrix where M_i,j represents the link from 'j' to 'i', such that for all 'j' sum(i, M_i,j) = 1
% Parameter d damping factor
% Return v, a vector of ranks such that v_i is the i-th rank from [0, 1]

function [v] = rank(M, d, v_quadratic_error)

N = size(M, 2); % N is equal to half the size of M
v = rand(N, 1);
v = v ./ norm(v, 2);
last_v = ones(N, 1) * inf;
M_hat = (d .* M) + (((1 - d) / N) .* ones(N, N));

while(norm(v - last_v, 2) > v_quadratic_error)
last_v = v;
v = M_hat * v;
v = v ./ norm(v, 2);
end

endfunction
``````

I can' figure out what's quadratic_error for. It's not described on wikipedia nor in the article's algorithm specification.

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It looks like it is a convergence test. The `while` loop ends when the L2 difference between `v` and `last_v` does not exceed the value of `v_quadratic_error`.
Here's a bit more explanation. First, note that `M_hat` is a matrix and `v` is a vector. The `while` loop replaces `v` with the product `M_hat * v` (normalized to be a unit vector). The loop ends when the change in `v` due to one iteration is small enough. That's what "convergence" means in this context.
This appears to be the standard power iteration loop for finding the eigenvector corresponding to the dominant eigenvalue of a matrix (in this case of `M_hat`). Without knowing more about the overall algorithm (which I'm not going to research), I can't say why this calculation is useful.