Certain squarefree levels of reducible modular mod\, Galois representations
Abstract
Let k 2 be an even integer, \5, k-1\ be a prime, and N be a squarefree positive integer. It is known that if the mod\, Galois representation f associated with a newform f of weight k, level N, and trivial nebentypus is reducible, then f 1 k-1, up to semisimplification, where is the mod\, cyclotomic character. In this paper, we determine the necessary and sufficient conditions under which the mod\, representation 1 k-1 arises from a newform of weight k, level N with exactly two prime factors with specified Atkin-Lehner eigenvalues. Specifically, this proves a conjecture of Billerey and Menares when N is a product of two primes under some mild assumption. As an application, we show that for any 5 and k=2 or +1, there exist a large class of distinct primes p and q such that the mod\, representation 1 k-1 arises from a newform of weight k and level pq with explicit Atkin-Lehner eigenvalues.
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