Abstract
We establish the existence of rank two Ulrich vector bundles on surfaces that are either of maximal Albanese dimension or with irregularity 1 1 , under many embeddings. In particular, we get the first known examples of Ulrich vector bundles on irregular surfaces of general type. Another consequence is that every surface such that either q ≤ 1 q \le 1 or q ≥ 2 q \ge 2 and its minimal model has rank one, carries a simple rank two Ulrich vector bundle.
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