Let $X$ be the closed subspace of Schwartz space $\mathcal{S}(\mathbb{R}^N)$ defined by
\begin{equation*} X=\left\{f\in\mathcal{S}(\mathbb{R}^N):\quad \int f\; dx=0\right\}. \end{equation*}
My question: Is $C_0^\infty(\mathbb{R}^N)\cap X$ dense in $X$, w.r.t. to the topology of $\mathcal{S}(\mathbb{R}^N)$?
Note that the usual way to approximate Schwartz functions by $C_0^\infty$-functions does not yield this, at least not directly:
Take $\eta_k$ to be radial functions on $[0,k]$ which decrease smoothly to zero on $[k,k+1]$. Then, for any Schwartz function $f$, we have $\eta_k f\rightarrow f$ in the topology of $\mathcal{S}(\mathbb{R}^N)$ and of course $\eta_k f\in C_0^\infty(\mathbb{R}^N)$. However, using the Fourier transform,
\begin{equation*} \int \eta_k f \;dx= \widehat{\eta_k f}(0)=(\hat{\eta}_k * \hat{f})(0). \end{equation*}
Now, a weak version of the uncertainty principle tells us that $\hat{\eta}_k$ cannot have compact support. Thus, even if $\hat{f}$ vanishes in an entire neighborhood around zero (which is actually the case I'm interested in), the convolution with $\hat{\eta}_k$ will generally ``smear out'' $\hat{f}$ so that $(\hat{\eta}_k * \hat{f})(0)\neq 0$, which means $\eta_kf\notin X$.
