Taiki Idomoto, Takao Suzuki. An affine Weyl group action on the basic hypergeometric series arising from the q-Garnier system. Letters in Mathematical Physics. 2022. 112. 6
Naoto Okubo, Takao Suzuki. Generalized q-Painlevé VI Systems of Type (A2n+1+A1+A1)(1) Arising From Cluster Algebra. International Mathematics Research Notices. 2022. 2022. 9. 6561-6607
Takao Suzuki. A Lax Formulation of a Generalized q-Garnier System. Mathematical Physics, Analysis and Geometry. 2021. 24. 4
Takao Suzuki, Naoto Okubo. Cluster algebra and $q$-Painlev\'e equations: higher order generalization and degeneration structure. RIMS Kokyuroku Bessatsu. 2020. B78. 53-75
Takashi Aoki, Takao Suzuki, Shofu Uchida. The Borel transform of the WKB solution to the Pearcey system. 2023
Takashi Aoki, Takao Suzuki, Shofu Uchida. An elementary proof of the Voros connection formula for WKB solutions to the Airy equation with a large parameter. 2022
An affine Weyl group action on the basic hypergeometric series
(10th International Congress on Industrial and Applied Mathematics (ICIAM 2023) 2023)
An affine Weyl group action on the basic hypergeometric series arising from the $q$-Garnier system
(Symmetries and Integrability of Difference Equations (SIDE) 14.2 2023)