Cropping Euler factors of modular \(L\)-functions (Q2855508)

Let \(f=\sum a_i q^i\) be a normalized newform in \(S_2(\Gamma_1(N))\) with Nebentypus \(\varepsilon\). Let \(\mathbb{E}\) be the field generated by the \(a_i\), which is a number field of some degree \(n\).NEWLINENEWLINELet \(A_f/\mathbb{Q}\) be the associated abelian variety of dimension \(n\). Let \(\mathbb{L}\) be the smallest field over which all the endomorphisms of \(A_f\) are defined. Then \(A_f\) is isogenous over \(\mathbb{L}\) to a power of a simple abelian variety \(B_f\) Let \(S_1\) be the set of primes that are completely split in \(\mathbb{L}\).NEWLINENEWLINEThe authors introduce the partial \(L\)-function \( \prod_{p\in S_1} \frac{1}{1-a_pp^{-s}+\varepsilon(p)p^{1-2s}}.\)NEWLINENEWLINEThe main result of the paper is a formula for \(\mathrm{ord}_{s=1}L(B_f/\mathbb{L},s)\) depending on the order of vanishing of the above partial \(L\)-function.