In this note, we prove that there exists a classical Hilbert modular cusp form over Q(sqrt{5}) of partial weight one which does not arise from the induction of a Grossencharacter from a CM extension of Q(sqrt{5}).
Given a finite set of nonnegative integers A with no 3-term arithmetic progressions, the Stanley sequence generated by A, denoted S(A), is the infinite set created by beginning with A and then greedily including strictly larger integers which do not
introduce a 3-term arithmetic progressions in S(A). Erdos et al. asked whether the counting function, S(A,x), of a Stanley sequence S(A) satisfies S(A,x)>x^{1/2-epsilon} for every epsilon>0 and x>x_0(epsilon,A). In this paper we answer this question in the affirmative; in fact, we prove the slightly stronger result that S(A,x)geq (sqrt{2}-epsilon)sqrt{x} for xgeq x_0(epsilon,A).
