Necessary conditions for the existence of Morita Contexts in the bicategory of Landau-Ginzburg Models
Abstract
We use a matrix approach to study the concept of Morita context in the bicategory LGK of Landau-Ginzburg models on a particular class of objects. In fact, we first use properties of matrix factorizations to state and prove two necessary conditions to obtain a Morita context between two objects of LGK. Next, we use a celebrated result (due to Schur) on determinants of block matrices to show that these necessary conditions are not sufficient. Finally, we state a trivial sufficient condition.
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