A combinatorial question about orthonormal bases

Question

Suppose that $F:S^{n-1}\to A$ is a map of sets from the unit sphere in $\mathbb R^n$ to an abelian group, and that the sum $F(v_1)+\dots +F(v_n)$ over an orthonormal basis is independent of the basis. Does it follow that $F$ is a constant function?

This is clearly false for $n=2$. I am wondering if it is true for sufficiently large $n$.

ADDED LATER The $\mathbb R$-valued examples in Cranch's answer may be combined into a single example $v\mapsto v\otimes v$ with values in $\mathbb R^n\otimes \mathbb R^n$, or $n\times n$ matrices. Its image generates the group of symmetric matrices with integer trace. It seems reasonable to expect that every continuous real-valued example comes from this one -- in other words has the form $v\mapsto B(v,v)$ for symmetric bilinear $B$. Maybe this can be worked out using Sawin's suggestion about representations of $O(n)$. But I was also curious about the general case, where the target group might not be (uniquely) divisible.

Answer 1

Given a vector $u$ and an orthonormal basis $x_1,\ldots,x_n$, we have $||u||^2 = \left<u,x_1\right>^2 + \cdots + \left<u,x_n\right>^2$. But that means that, if you choose a nonzero $u$, then the function $F(x) = \left<u,x\right>^2$ gives a counterexample.

Answer 2

For the group $\mathbb{R}$, this was considered a long time ago by Andrew Gleason to solve a problem in the foundations of quantum mechanics.

http://www.iumj.indiana.edu/IUMJ/FULLTEXT/1957/6/56050

Such maps are called frame functions. For $n \geq 3$, frame functions $S^{n-1} \rightarrow \mathbb{R}$, taking positive values correspond to positive-definite operators on $\mathbb{C}^n$. When the sum is chosen to be 1, one gets density matrices.

Of course, if one drops the positivity and boundedness requirements, one can get horribly complicated functions using a nonlinear group automorphism of $\mathbb{R}$.

I am interested as to Tom Goodwillie's reasons for considering this problem.