The sturdy Lefschetz property of sure modules over Clements-Lindström rings
Authors: Bek Chase
Summary: We introduce a technique for learning the Lefschetz properties for ok[x,y]-modules based mostly on the Lindström-Gessel-Viennot Lemma. Specifically, we show that sure modules over Artinian Clements-Lindström rings in attribute zero have the sturdy Lefschetz property. Specifically, we present that each homogeneous concept in a Clements-Lindström ring of embedding dimension two has the sturdy Lefschetz property. As an utility, we examine the sturdy Lefschetz property of kind two monomial beliefs of codimension three. △