Mathematics – General Mathematics
Scientific paper
2007-03-14
Mathematics
General Mathematics
17 pages
Scientific paper
For an integer $m\geq 1$, a combinatorial manifold $\widetilde{M}$ is defined to be a geometrical object $\widetilde{M}$ such that for $\forall p\in\widetilde{M}$, there is a local chart $(U_p,\phi_p)$ enable $\phi_p:U_p\to B^{n_{i_1}}\bigcup B^{n_{i_2}}\bigcup...\bigcup B^{n_{i_{s(p)}}}$ with $B^{n_{i_1}}\bigcap B^{n_{i_2}}\bigcap...\bigcap B^{n_{i_{s(p)}}}\not=\emptyset$, where $B^{n_{i_j}}$ is an $n_{i_j}$-ball for integers $1\leq j\leq s(p)\leq m$. Integral theory on these smoothly combinatorial manifolds are introduced. Some classical results, such as those of {\it Stokes'} theorem and {\it Gauss'} theorem are generalized to smoothly combinatorial manifolds in this paper.
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