starting from the beginning of
* ((((2)^(1 / (1 - epsilon)) - (z_hat + eta)^(1 / (1 - epsilon))) + (((z_hat - eta)^(1 / (1 - epsilon))) - (z_star)^(1 / (1 - epsilon))) ...
you have one extra ( that does not have a matching )
value = z_star - z_star * (((1 - alpha) * epsilon) / (1 - alpha * epsilon))^((1 - epsilon) / epsilon) - q^((1 - epsilon) / epsilon) * (K_bar)^((epsilon - 1) / epsilon) * (1)^((epsilon - 1) / (alpha * epsilon)) * ((1 - alpha) / alpha)^((1 - alpha) * (epsilon - 1) / (alpha * epsilon)) * (epsilon)^(((1 - epsilon + alpha * epsilon) * (1 - epsilon)) / (alpha * epsilon^2)) * ((alpha) / (1 - alpha * epsilon))^((1 - epsilon) / epsilon) * (alpha * epsilon)^((epsilon - 1) / (alpha * epsilon^2)) * (((1 - epsilon) / (0 - 2))^((1 - epsilon) * (epsilon - 1 + alpha * epsilon) / (alpha * epsilon^2))) * ((((2)^(1 / (1 - epsilon)) - (z_hat + eta)^(1 / (1 - epsilon))) + (((z_hat - eta)^(1 / (1 - epsilon))) - (z_star)^(1 / (1 - epsilon))) + ((1 - gamma)^(epsilon / (1 - epsilon))) * (((z_hat + eta)^(1 / (1 - epsilon))) - ((z_hat - eta)^(1 / (1 - epsilon)))))^((1 - epsilon) * (epsilon - 1 + alpha * epsilon) / (alpha * epsilon^2)) - z_star;
% 123 2 1 2 10 12 1 0 12 1 0 1 0 12 1 0 1 0 12 1 2 10 12 1 0 12 1 2 1 2 10 1 0 123 2 3 21 2 10 12 1 2 10 12 1 0 1 0 12 1 2 10 123 2 3 21 23 2 3 2 3 210 1234 3 4 5 43 4 3 4 5 432 345 4 5 6 543 4 3 4 5 432 34 3 4 5 432 345 4 5 6 543 45 4 5 6 54321 23 2 3 2 3 21
The number under each bracket is the number of open brackets in effect "after" the character above the number.
