We present a novel approach to eigenvector universality for generalized Wigner matrices. Our main consequences are asymptotic normality of joint eigenvector projections everywhere in the spectrum as well as a quantitative lower bound on the largest entry of an eigenvector. In the case of smooth entries, we are able to obtain joint normality of an explicit growing number of eigenvector projections, and we are also able to obtain an explicit rate of convergence in Kolmogorov distance. This is based on a new analysis of the Dyson vector flow which does not rely on the eigenvector moment flow.
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