Since the prime factorization of 210=2\cdot 3\cdot 5\cdot 7 What we have to basically do is find out the number of ways we distribute these factors among the four variables x_1,x_2,x_3 and x_4 ...

The following reformulation of properness is often very useful in practice. Proposition. (Lee, Introduction to smooth manifolds , Proposition 21.5) Let M be a manifold and G a Lie group acting ...

Note The theorem below is actually trivial without the lemma. The lemma seems interesting as well; this will be rewritten as a three part tfae soon. Theorem Suppose 1\le p<\infty and X is a ...

Using (2) repeatedly you get \lvert x_1 - x_2 \rvert = \frac{\lvert x_2-x_3\rvert }{x_2x_3} = \frac{\lvert x_3-x_4\rvert }{x_2x_3^2x_4} = \ldots = \frac{\lvert x_{n}-x_1 \rvert }{x_2x_3^2x_4^2\cdots x_{n-1}^2x_n^2x_1} \\ = \frac{\lvert x_1-x_2 \rvert }{x_2x_3^2x_4^2\cdots x_{n-1}^2x_n^2x_1^2 x_2} = \frac{\lvert x_1-x_2 \rvert }{(x_1\cdots x_n)^2} ...

I remember there is a theorem . Since G(x) is bounded and increasing, also we know that [0,1] is compact. And an increasing function has at most countable discontinuous points. So it satisfies ...

Observe that T is a linear map, as f\mapsto g\cdot f and f\mapsto f' are linear, so for injectivity it is enough to check that T(f)=0 implies f=0. To see, it is not surjective, look at the ...