Abstract
We study the generalized doubling method for pairs of representations of
$G\times\mathrm{GL}_k$ where $G$ is a symplectic group, split special orthogonal group or split general spin group. We analyze the poles of the local integrals, and prove that the global completed $L$-function with a cuspidal representation of $\mathrm{GL}_k$ twisted by a highly ramified Hecke character
is entire. We obtain a new proof of the weak functorial transfer of cuspidal automorphic representations of $G$ to the natural general linear group, which is independent of the trace formula and its prerequisites, by combining our results with the Converse Theorem.
