王新,山东大学数学学院教授、齐鲁青年学者。研究方向为辛几何与数学物理,研究领域是Gromov-Witten理论。
2015年6月在北京大学取得博士学位,导师为刘小博教授。
2016年12月-2019年1月在美国哥伦比亚大学做访问学者。
1.辛几何与数学物理
(1) 王新.Virasoro constraints for Hodge integrals.COMMUNICATIONS IN NUMBER THEORY AND PHYSICS.2025,19 (3):631-682
(2) 王新.Universal Constraints for Hodge Integrals with Target Varieties.INTERNATIONAL MATHEMATICS RESEARCH NOTICES.2025,2025 (20)
(3) 王新.The genus two G-function for cubic elliptic orbifold and modularity.LETTERS IN MATHEMATICAL PHYSICS.2024 (114)
(4) Universal Equations for Higher Genus Gromov–Witten Invariants from Hodge Integrals.Communications in Mathematical Physics.2024 (405)
(5) 王新.Finite Generation and Holomorphic Anomaly Equation for Equivariant Gromov-Witten Invariants of K-P1xP1.FRONTIERS OF MATHEMATICS.2023,18 (1):17-46
(6) Topological Recursion Relations from Pixton's Formula.MICHIGAN MATHEMATICAL JOURNAL.2023,73 (2):227-241
(7) 王新.The genus two G-function for the cubic elliptic singularity.LETTERS IN MATHEMATICAL PHYSICS.2021,111 (6)
(8) 王新.Higher Genus FJRW Theory for Fermat Cubic Singularity.数学学报(英文版)Actamathematicasinica.2021,37 (8):1179
(9) 王新.A genus-4 topological recursion relation for Gromov-Witten invariants.SCIENCE CHINA Mathematics.2020,63 (1):101
(10) 王新.Quasi-modularity and Holomorphic Anomaly Equation for the Twisted Gromov-Witten Theory: O(3) over P-2.数学学报(英文版)Actamathematicasinica.2019,35 (12):1945
1. Gromov-Witten不变量、Hodge积分与曲线模空间, 2025-08-27-2029-12-31
2. Gromov-Witten不变量的Virasoro猜想, 2022-12-01-2027-11-30
3. (包干项目)卡拉比-丘型纽Gromov-Witten不变量的若干问题研究, 2021-12-23-2024-12-31
4. 哈密顿系统中奇性轨道的研究, 2020-09-18-2024-12-31
5. Gromov-Witten不变量亏格-1的Virasoro猜想, 2016-10-29-2019-06-30
6. 高亏格Gromov-Witten不变量和Virasoro猜想, 2016-08-17-2019-12-31
