This site is being phased out.
Search results
From Mathematics Is A Science
Jump to navigationJump to searchCreate the page "Chain Extension Theorem" on this wiki! See also the search results found.
- ...ons doesn't have to be a cell map. As a result we are unable to define its chain map $f_{\Delta}:C(K)\to C(L)$ and unable to define or compute its homology ==The Simplicial Approximation Theorem==51 KB (9,162 words) - 15:33, 1 December 2015
- Further, we compute the chain maps <center>topological spaces $\longrightarrow$ cell complexes $\longrightarrow$ chain complexes $\longrightarrow$ homology groups.</center>42 KB (7,005 words) - 03:10, 30 November 2015
- where $AX$ is any $1$-chain from $A$ to $X$ in $K$, i.e., any $1$-chain $AX=a\in K^{(1)}$ with $\partial a=X-A$. ...h is always the case when $K$ is acyclic). Indeed, if $a'$ is another such chain, we have47 KB (8,415 words) - 15:46, 1 December 2015
- *[[Arrow's Impossibility Theorem|Arrow's Impossibility Theorem]] *[[Arzela-Ascoli Theorem|Arzela-Ascoli Theorem]]16 KB (1,773 words) - 00:41, 17 February 2016
- Further, we compute the chain maps <center>topological spaces $\longrightarrow$ cell complexes $\longrightarrow$ chain complexes $\longrightarrow$ homology groups.</center>41 KB (6,926 words) - 02:14, 21 October 2015
- Further, we compute the chain maps ...-chains to $k$-chains. More precisely, $g$ is a collection of functions (a chain map):31 KB (5,330 words) - 22:14, 14 March 2016
- '''Theorem (Uniqueness).''' The solution to the IVP above, if exists, is given iterati '''Theorem (Existence).''' If the values of the vector field $P$ are ''edges'' of $K$,26 KB (4,649 words) - 12:43, 7 April 2016
- <center> the boundary of a $k$-cell is a chain of $(k-1)$-cells.</center> <center> '' $0$ is a $k$-chain, for any $k$.'' </center>46 KB (7,844 words) - 12:50, 30 March 2016
- '''Proposition.''' If $C_k(K)$ is the $k$-chain group of cell complex $K$, then '''Theorem (Inclusion-Exclusion Formula).''' For sets $A,B \subset X$, we have:41 KB (7,169 words) - 14:00, 1 December 2015
- <center>the boundary of a $k$-cell is a chain of $(k-1)$-cells.</center> ...', then its boundary $\partial\sigma = \sum_i \partial\sigma _i$ is also a chain.34 KB (5,644 words) - 13:35, 1 December 2015
- *“the chain $q=a+b+c+d$ goes once around the hole”. $\\$ *$p:=q+q=(a+b+c+d)+(a+b+c+d)=0$, even though it seems that “the chain $p$ goes twice around the hole”.32 KB (5,480 words) - 02:23, 26 March 2016
- Therefore, by the Classification Theorem of Vector Spaces, we have the following: '''Theorem.'''45 KB (6,860 words) - 16:46, 30 November 2015
- A chain of edges These sets include $0$ understood as the chain with all coefficients equal to $0$.36 KB (6,177 words) - 02:47, 21 February 2016
- ==Sequences of chain groups== ...of''<!--\index{chain groups}--> $K$ and we call $C_k$ the ''total'' $k$-''chain group''.14 KB (2,374 words) - 02:54, 16 October 2014
- but only if the inverse exists! The theorem below gives us a sufficient condition when this is the case. ==The Vietoris Mapping Theorem==24 KB (4,382 words) - 15:52, 30 November 2015
- ...e oriented edge in ${\mathbb R}$, or a combination of edges. It is a $1$-''chain''. Furthermore, the force $F$ defines $W$ as a linear function of $D$. It i Our conclusion doesn't change: $D$ is a $1$-chain and $F$ is a $1$-form. Even though this idea allows us to continue our stud16 KB (2,753 words) - 13:55, 16 March 2016
- where $AX$ is the $1$-chain from $A$ to $X$, i.e., $\partial AX=X-A$. ...ppose $b:=BC\in {\mathbb R}$. Then, by the Stokes Theorem<!--\index{Stokes Theorem}-->, we have16 KB (2,913 words) - 22:40, 15 July 2016
- '''Theorem.''' An ODE the right-hand side of which is a function independent of $y$ an '''Theorem.''' An ODE the right-hand side of which is a function independent of $y$ an64 KB (11,426 words) - 14:21, 24 November 2018
- A chain of edges These sets include $0$ as the chain with all coefficients equal to $0$.28 KB (4,685 words) - 17:25, 28 November 2015
- ...$T$, provide the Riemann sum for the integral and an illustration for the theorem. *(a) State Stokes' Theorem for “simple regions”. (b) Use part (a) to compute the area of a circle.14 KB (2,538 words) - 18:35, 14 October 2017
