English

Harder's conjecture II

Number Theory 2023-08-09 v2

Abstract

Let ff be a primitive form of weight 2k+j22k+j-2 for SL2(Z)SL_2(Z), and let p\mathfrak p be a prime ideal of the Hecke field of ff. We denote by SPm(Z)SP_m(Z) the Siegel modular group of degree mm. Suppose that k0mod2, j0mod4k \equiv 0 \mod 2, \ j \equiv 0 \mod 4 and that p\mathfrak p divides the algebraic part of L(k+j,f)L(k+j,f). Put k=(k+j/2,k+j/2,j/2+4,j/2+4){\bf k}=(k+j/2,k+j/2,j/2+4,j/2+4). Then under certain mild conditions, we prove that there exists a Hecke eigenform FF in the space of modular forms of weight (k+j,k)(k+j,k) for SP2(Z)SP_2(Z) such that [I2(f)]k[I_2(f)]^{\bf k} is congruent to A4(I)(F)A^{(I)}_4(F) modulo p\mathfrak p. Here, [I2(f)]k[I_2(f)]^{\bf k} is the Klingen-Eisenstein lift of the Saito-Kurokawa lift I2(f)I_2(f) of ff to the space of modular forms of weight k{\bf k} for SP4(Z)SP_4(Z), and A4(I)(F)A^{(I)}_4(F) is a certain lift of FF to the space of cusp forms of weight k{\bf k} for SP4(Z)SP_4(Z). As an application, we prove Harder's conjecture on the congruence between the Hecke eigenvalues of FF and some quantities related to the Hecke eigenvalues of ff.

Keywords

Cite

@article{arxiv.2306.07582,
  title  = {Harder's conjecture II},
  author = {Hiraku Atobe and Masataka Chida and Tomoyoshi Ibukiyama and Hidenori Katsurada and Takuya Yamauchi},
  journal= {arXiv preprint arXiv:2306.07582},
  year   = {2023}
}

Comments

arXiv admin note: text overlap with arXiv:2109.10551

R2 v1 2026-06-28T11:03:39.653Z