"?名高宏,野本文彦,實川裕斗","工業科・理科の基礎となる数学教育教材の開発と評価",,"東京工業大学附属科学技術高等学校研究報告",,"Vol. 19",,"pp. 37-43",2024,Mar. "小山桂佑,山城六三郎,樫村耕佑,岡本敬,永原健大郎,野本文彦","身近な題材で数学的政策評価方法を指導する 「課題学習」導入教材の開発と実践",,"Informatio","江戸川大学情報教育研究所","Vol. 19",,"pp. 1-12",2022,Mar. "松田稔樹,野本文彦","総合から各教科への逆向き設計を促す教師教育用仮想授業ゲームの設計フレームワークの検討と実践",,"Informatio","江戸川大学情報教育研究所","Vol. 18",,"pp. 19-30",2021,Mar. "野本 文彦","2次曲線の有用性を実感できる授業の実践とその評価",,"東京工業大学附属科学技術高等学校 研究報告",,,"No. 16","pp. 45-54",2021,Mar. "野本 文彦","高校数学教材としての数理ファイナンス入門",,"東京工業大学附属科学技術高等学校 研究報告",,,"No. 15","pp. 47-65",2020,Mar. "Satoshi Naito,Fumihiko Nomoto,Daisuke Sagaki","Tensor product decomposition theorem for quantum Lakshmibai-Seshadri paths and standard monomial theory for semi-infinite Lakshmibai-Seshadri paths",,"J. Combin. Theory Ser. A","Elsevier Inc.","Vol. 169",,,2020,Jan. "Satoshi Naito,Fumihiko Nomoto,Daisuke Sagaki","Representation-theoretic interpretation of Cherednik-Orr's Recursion Formula for the specialization of nonsymmetric Macdonald polynomials at t = infinity",,"Transformation Groups","Birkhauser","Vol. 24","No. 1","pp. 155-191",2019,Mar. "Satoshi Naito,Fumihiko Nomoto,Daisuke Sagaki","Specialization of nonsymmetric Macdonald polynomials at t = infinity and Demazure submodules of level-zero extremal weight modules",,"Transactions of the American Mathematical Society","American Mathematical Society","Vol. 370","no. 4","pp. 2739--2783",2018,Apr. "Fumihiko Nomoto","Specialization of nonsymmetric Macdonald polynomials at t = ∞ and level-zero representations of quantum affine algebras",,,,,,,2018,Mar. "野本文彦","非対称マクドナルド多項式のt=∞での特殊化と量子ア フィン代数のレベル・ゼロ表現",,,,,,,2018,Mar. "Fumihiko Nomoto","Specialization of nonsymmetric Macdonald polynomials at t = ∞ and level-zero representations of quantum affine algebras",,,,,,,2018,Mar.