Let h(x)= g \circ f = \mbox{sgn}(x)(1−\mbox{sgn}^2(x)). For x>0, \mbox{sgn}(x)=1 so h(x) = 0. For x=0, \mbox{sgn}(x)=0 so h(x) = 0. For x<0, \mbox{sgn}(x)=-1 so h(x) = 0. Thus h(x) ...

We call it odd function . P.S. We call a function which satisfies f(-x)=f(x) even function.

You can try f(x)=\mathrm{sgn}\!\left(\mathrm{sgn}(x)+\frac12\right)

The derivative simply doesn't exist where f(x) = 0, f'(x) \ne 0. Apart from that, the chain rule dictates |f(x)|' = \mathrm{sgn}(f(x)) f'(x) Conversely you have \int_0^x |t|\ \mathrm dt = \frac12\mathrm{sgn}(x)x^2 ...

For the last term, use |\mathbb{E} X(V_n-V) 1_{|X|>N}| \leq C |\mathbb{E} X 1_{\{|X|>N\}}|, where C is our bound on V_n. So using your argument above you get a bound like \lim_{n\to\infty} |\mathbb{E}X_nV_n - \mathbb{E}XV| \leq C |\mathbb{E} X1_{\{|X|>N\}}|, ...

Here are a couple ways to see that \widetilde{\mathrm{Gr}}(2,2) is S^2\times S^2. Method One : Let \mathrm{UT}S^3 be the unit tangent bundle of S^3. This is a subbundle of the tangent bundle ...