User:PMajer/sb

1. First one proves half of the claim: that is, with only ${\displaystyle f(x)}$. Given ${\displaystyle f}$, an entire function $${\displaystyle \phi >f}$$ is easily found of the form $${\displaystyle \phi (x):=\sum _{k=1}^{\infty }\left({\frac {x}{n}}\right)^{n_{k}}}$$ with a convenient increasing sequence of even positive integers $n_k$. 2. Then one treats the case with $f=0 < g$, that is settled with a $${\displaystyle \phi }$$ of the form $${\displaystyle \exp(-\psi )}$$ (warning: $${\displaystyle 1/\phi }$$ wouldn't work, for it may have poles.) This in particular gives positive real entire convolution kernels with any prescribed decay. 3. Case of $${\displaystyle h:=(f+g)/2\in C_{c}^{0}(\mathbb {R} ).}$$ A correseponding $\phi$ is a mollification of $h$ with an entire convolution kernel $${\displaystyle \kappa }$$ : $${\displaystyle \phi :=h*\kappa }$$, which is still an entire function. 4. If $${\displaystyle h\in C^{0}(\mathbb {R} )}$$ is any continuous function, one writes $${\displaystyle h:=\sum _{j=1}^{\infty }h_{j}}$$ with $${\displaystyle h_{j}\in C_{c}^{0}(\mathbb {R} )}$$, a series totally convergent on compacta: $${\displaystyle \sum _{j=1}^{\infty }\|h_{j}\|_{\infty ,[-T,T]}<\infty }$$ for all $${\displaystyle T}$$.