%0 Generic %1 maulik2022conjecture %A Maulik, Davesh %A Shen, Junliang %D 2022 %K Perverse %T The $P=W$ conjecture for $GL_n$ %U http://arxiv.org/abs/2209.02568 %X We prove the $P=W$ conjecture for $GL_n$ for all ranks $n$ and curves of arbitrary genus $g2$. The proof combines a strong perversity result on tautological classes with the curious Hard Lefschetz theorem of Mellit. For the perversity statement, we apply the vanishing cycles constructions in our earlier work to global Springer theory in the sense of Yun, and prove a parabolic support theorem.

@misc{maulik2022conjecture, abstract = {We prove the $P=W$ conjecture for $\mathrm{GL}_n$ for all ranks $n$ and curves of arbitrary genus $g\geq 2$. The proof combines a strong perversity result on tautological classes with the curious Hard Lefschetz theorem of Mellit. For the perversity statement, we apply the vanishing cycles constructions in our earlier work to global Springer theory in the sense of Yun, and prove a parabolic support theorem.}, added-at = {2022-09-07T13:12:14.000+0200}, author = {Maulik, Davesh and Shen, Junliang}, biburl = {https://www.bibsonomy.org/bibtex/2bee34891cae41f1bf6cc1942ab2076e2/dragosf}, description = {The $P=W$ conjecture for $\mathrm{GL}_n$}, interhash = {75121725f9535389ceb13ba79aea3dc6}, intrahash = {bee34891cae41f1bf6cc1942ab2076e2}, keywords = {Perverse}, note = {cite arxiv:2209.02568Comment: 23 pages. Comments are welcome}, timestamp = {2022-09-07T13:12:14.000+0200}, title = {The $P=W$ conjecture for $\mathrm{GL}_n$}, url = {http://arxiv.org/abs/2209.02568}, year = 2022 }