Compact periods of Eisenstein series of orthogonal groups of rank one at even primes (Q2439673)

Let \(\pi_1\), \(\pi_2\) be two irreducible automorphic cuspidal representations of \(O(V)\) and \(O(W)\) where \(W\) is a codimension one quadratic subspace of \(V\). The Gross-Prasad conjecture considers the pairing of two cusp forms \(\varphi_1\in \pi_1\) and \(\varphi_2\in \pi_2\): \[ \int_{[O(W)]} \varphi_1(g)\varphi_2(g)\;dg \] and relates the non-vanishing of the above pairing with the non-vanishing of the \(L\)-value \newline \(L(\pi_1\times\pi_2,\frac12)\). In this paper the author considers a similar pairing, where \(\varphi_1\) is instead an Eisenstein series, and \(O(W)\) is an anisotropic group, with the assumption that the data are unramified. In a previous paper [Indiana Univ. Math. J. 62, No. 3, 869-890 (2013; Zbl 1301.11049)], the author computed the associated local factors when the residue characteristic is odd. This paper is a follow up and computes the local factors when the residue characteristic is even.