Rota-Baxter operators and Loday-type algebras on the BiHom-associative conformal algebras

Abstract: (Tri)dendriform algebras, Rota-Baxter operators, and closely related NS-algebras have a number of dominant applications in physics, especially in quantum field theory. Proceeding from the recent study relating these structures, this paper considers (tri)dendriform algebras, NS-algebras, and (twisted)Rota-Baxter operators in the context of BiHom-associative conformal algebras. A comprehensive investigation of the BiHom-(tri)dendriform conformal algebras and their characterization in terms of conformal bimodule has been conducted. The study of BiHom-NS-conformal algebra reveals that it is not only a generalization of NS-conformal algebra using two structural maps but is also the generalization of BiHom-(tri)dendriform conformal algebras. Additionally, it is found to have a close proximity between BiHom-twisted Rota-Baxter operators and BiHom-NS-conformal algebras. The comparative study to Rota-Baxter operators on BiHom-associative conformal algebras and Rota-Baxter operators on BiHom-(tri)dendriform conformal algebras reveals a relationship between BiHom-quadri conformal algebra and Rota-Baxter operators. In the end, the concept of Rota-Baxter system (a generalization of the Rota-Baxter operator) for BiHom-associative conformal algebras and BiHom-dendriform conformal algebras is narrated, where the interconnections of these algebras are depicted. Furthermore, a connection is established between BiHom-quadri conformal algebras and Rota-Baxter systems for BiHom-dendriform conformal algebras.