X_i be the i(=2,3)-genus closed orientable surface. So to compute H_1 we need to see the structure of fundamental group. As we know that a g-genus orieted surface has the cell structure with ...

\newcommand{\Var}{\operatorname{Var}} The formula you give is not for two independent random variables. It's for random variables that are as far from independent as you can get. If X,Y are ...

I don't understand the point of your question. If it is easier to describe the construction in \widehat{\mathbb{C} \downarrow X} than in \hat{\mathbb{C}} \downarrow Y(X), then why not use the ...

The Yoneda lemma, when applied to the case where F is itself a representable functor h_B, gives you an isomorphism \mathrm{Hom}(A,B)=h_B(A)\cong \mathrm{Hom}(h_A,h_B) (note that the two \mathrm{Hom} ...

A space X has the "finite-closed" topology, if the only closed sets are X and the finite subsets of X. If X_1,X_2 are two infinite spaces, then X_1 \setminus \{x_1\} is open in X_1 if X_1 ...

This is just a very rough sketch of a proof -- you'll need to fill in some of the relevant hypotheses and do some commutative algebra to make it rigorous -- but it's possible to give a rigorous proof ...