On the Up-operator in characteristic p
Abstract
For a perfect field of characteristic p>0, a positive ingeger N not divisible by p, and an arbitrary subgroup of GL2(Z/NZ), we prove (with mild additional hypotheses when p 3) that the U-operator on the space Mk(/) of (Katz) modular forms for over induces a surjection U:Mk(/)→ Mk'(/) for all k p+2, where k'=(k-k0)/p + k0 with 2 k0 p+1 the unique integer congruent to k modulo p. When =Fp, p 5, N≠ 2,3, and is the subgroup of upper-triangular or upper-triangular unipotent matrices, this recovers a recent result of Dewar.
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