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For a commutative ring $k$, a biset functor over $k$ is an $k$-linear functor on the biset category, whose objects are finite groups and whose morphism sets are given by the Grothendieck groups $B(G,H)$ of finite $(G,H)$-bisets. The remarkable results as the evaluation of the Dade group of endopermutation modules of a $p$-group and finding the unit group of the Burnside ring of a $p$-group are done using the theory of biset functors. Looking for ring objects in the category of biset functors one gets a more sophisticated structure which is called a Green biset functor. Serge Bouc introduced the slice Burnside ring and the section Burnside ring for a finite group $G$. He also showed that these two rings have a natural structure of a Green biset functor. In our work we classified simple modules over the section Burnside ring of $G$ using the approach of the fibered biset functors article by Robert Boltje and Olcay Co\c{s}kun.