**Theorem** $S^{n-1}$ disconnects $S^n$ into two open connected components, which have $S^{n-1}$ as frontier. >In $R^3$, if we replace sphere of standard torus with genus $g\geq1$, we may have "The Jordan-Brouwer Separation Theorem" intuitively. Then what happens when we replace topological sphere of topology torus with genus $g\geq1$? >We have $T^n$ in $R^{n+1}$, so do we have the same theorem? >What is the situation ahout manifold? **Theorem** $H_k(S^n-S^r)=R,k=n-r-1$. >Does this theorem have the corresponding generalization?