Pinnacles for Complex Reflection Groups
Abstract
We study, characterize, and enumerate the admissible pinnacle sets of nonexceptional complex reflection groups G(m,p,n), which include all generalized symmetric groups Zm Sn as special cases. This generalizes the work of Davis--Nelson--Petersen--Tenner for symmetric groups Sn and Gonz\'alez--Harris--Rojas Kirby--Smit Vega Garcia--Tenner for signed symmetric groups Z2 Sn. As a consequence, we prove a conjecture of Gonz\'alez--Harris--Rojas Kirby--Smit Vega Garcia--Tenner for pinnacles of signed permutations.
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