On generalized Weierstrass semigroups in arbitrary Kummer extensions of F q ( x )

In this work, we investigate generalized Weierstrass semigroups in arbitrary Kummer extensions of the rational function field F q ( x ) . We analyze their structure and properties, with a particular emphasis on their maximal elements. Explicit descriptions of the sets of absolute and relative maximal elements within these semigroups are provided. Additionally, we apply our results to function fields of the maximal curves X a , b , n , s and Y n , s , which cannot be covered by the Hermitian curve, and the Beelen-Montanucci curve. Our results generalize and unify several earlier contributions in the theory of Weierstrass semigroups, providing new perspectives on the relationship between these semigroups and function fields.