Consider the following theorem of Brauer (Ref. Isaacs' Character theory, p. 70).
Let $\chi$ be a complex character of a finite group $G$ such that $\langle \chi, 1_G\rangle=0$ (i.e. the trivial character of $G$ is not a constituent of $\chi$). If $A,B\subseteq G$ such that $$\langle \chi_A, 1_A\rangle + \langle \chi_B,1_B\rangle>\langle \chi_{A\cap B}, 1_{A\cap B}\rangle$$ then $A\cup B$ generate proper subgroup of $G$.
Here, the inner product is given by $$\langle \chi_A,1_A\rangle = \frac{1}{|A|} \sum_{a\in A}\chi(a)1_A(a^{-1}).$$ Q.0 The $A$ and $B$ are subsets, not necessarily subgroups, is this right?
Q.1 If $A\cap B$ is empty what should we understand by $\chi_{A\cap B}$? Is it $0$ or $1$? or no such consideration is there on $A\cap B$?
Q.3 What is the (name of) original paper of Brauer for this result?