Title: Lower bounds on Loewy lengths of modules of finite projective dimension

Abstract: In this article we study nonzero modules of finite length and finite projective dimension over a local ring. We show the Loewy length of such a module is larger than the regularity of the ring whenever the ring is strict Cohen-Macaulay, extending work of Avramov-Buchweitz-Iyengar-Miller beyond the Gorenstein setting. Applications include establishing a conjecture of Corso-Huneke-Polini-Ulrich and verifying a Lech-like conjecture, comparing generalized Loewy length along flat local extensions, for strict Cohen-Macaulay rings. We also give significant improvements on known lower bounds for Loewy lengths of modules of finite projective dimension without any assumption on the associated graded ring. The strongest general bounds are achieved over complete intersection rings.