Anyone??

Let $P(x,y)$ be the assertion. $P(x,2y+2019)-P(x,2019)\implies$ $a(f(x+2y+2019)-f(x+2019))-b(f(x-2019)-f(x-2y-2019))=g(2y+2019)-g(2019)\,\forall y\ge 0$. $P(x+y,3y+2019)-P(x+y,y+2019)\implies$ $a(f(x+4y+2019)-f(x+2y+2019))-b(f(x-2019)-f(x-2y-2019))=g(3y+2019)-g(y+2019)\,\forall y\ge 0$. Subtracting the first equation from the second equation gives $a(f(x+4y+2019)-2f(x+2y+2019)+f(x+2019))=F(y)\,\forall y\ge 0$ for some function $F:\mathbb{R}\to\mathbb{R}$. Now it is easy to see that $h(y)\equiv \frac{1}{a}F\left(\frac{|y|}{2}\right)$ works.Done.