User:John R. Brews/Sandbox: Difference between revisions
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==Tensor== | |||
In ''physics'' a '''tensor''' in its simplest form is a proportionality factor between two [[vector]] quantities that may differ in both magnitude and direction, and which is a relation that remains the same under changes in the coordinate system. Mathematically this relationship in some particular coordinate system is: | |||
{{ | :<math> v_j = \sum_{k} \chi_{jk} w_k \ , </math> | ||
or, introducing unit vectors '''ê<sub>j</sub>''' along the coordinate axes: | |||
:<math> | |||
\begin{align} | |||
\mathbf {v} & = v_1 \mathbf{\hat {e}_1} + v_2 \mathbf{\hat{e}_2} + ...\\ | |||
& = \left(\chi_{11} w_1 +\chi_{12}w_2 ...\right)\mathbf{\hat {e}_1} +\left(\chi_{21} w_1 +\chi_{22}w_2 ... \right)\mathbf{\hat {e}_2} ... | |||
\end{align} | |||
</math> | |||
{{ | where '''v''' is a vector with components {v<sub>j</sub>} and '''w''' is another vector with components {w<sub>j</sub>} and the quantity <math>\overleftrightarrow\boldsymbol{ \Chi}</math> = {χ<sub>ij</sub>} is a tensor. Because '''v''' and '''w''' are vectors, they are physical quantities independent of the coordinate axes chosen to find their components. Likewise, if this relation between vectors constitutes a physical relationship, then the above connection between '''v''' and '''w''' expresses some physical fact that transcends the particular coordinate system where <math>\overleftrightarrow\boldsymbol{ \Chi}</math> = {χ<sub>ij</sub>}. | ||
A rotation of the coordinate axes will alter the components of '''v''' and '''w'''. Suppose the rotation labeled ''A'' is described by the equation: | |||
:<math> \mathbf {\hat {e}'_i} = \Sigma_j A_{ij} \mathbf {\hat {e}_j} \ , </math> | |||
:<math>\mathbf {\hat {e}_i} = \Sigma_j A^{-1}_{ij} \mathbf {\hat {e}'_j} \ , </math> | |||
Then: | |||
:<math>\mathbf v = \sum_i v_i \mathbf {\hat {e}_i} = \sum_j v'_j \mathbf {\hat {e}'_j} \ , </math> | |||
and | |||
:<math>\mathbf v = \sum_i v_i \sum_j A^{-1}_{ij} \mathbf {\hat {e}'_j} = \sum_i \sum_k \chi_{ik} w_k \sum_j A^{-1}_{ij} \mathbf {\hat {e}'_j} \ , </math> | |||
{{ | :<math>\mathbf w = \sum_m w'_m \sum_k A_{mk} \mathbf {\hat {e}_k} \ ,</math> | ||
< | :<math>\mathbf v = \sum_i \sum_k \chi_{ik} \sum_m w'_m A_{mk} \sum_j A^{-1}_{ij} \mathbf {\hat {e}'_j} = \sum_m \chi'_{jm} w'_m \mathbf {\hat {e}'_j} \ , </math> | ||
{ | so, to be a tensor, the components of <math>\overleftrightarrow\boldsymbol{ \Chi}</math> transform as: | ||
:<math>\chi'_{jm}= \sum_i \sum_k \chi_{ik} A_{mk} A^{-1}_{ij} </math> | |||
</ | More directly: | ||
:<math> \mathbf v' = A \mathbf v = A \overleftrightarrow\boldsymbol{ \Chi} \mathbf w = A \overleftrightarrow{\boldsymbol {\Chi}} A^{-1} A \mathbf w = A \overleftrightarrow{\boldsymbol {\Chi}} A^{-1} \mathbf w' \ ,</math> | |||
where '''v'''' = '''v''' because '''v''' is a vector representing some physical quantity, say the velocity of a particle. Likewise, '''w'''' = '''w'''. The new equation represents the same relationship provided: | |||
< | :<math>\overleftrightarrow\boldsymbol{ \Chi} = A \overleftrightarrow {\boldsymbol {\Chi}}A^{-1} \ .</math> | ||
This example is a ''second rank'' tensor. The idea is extended to ''third'' rank tensors that relate a vector to a second rank tensor, as when electric polarization is related to stress in a crystal, and to ''fourth'' rank tensors that relate two second rank tensors, and so on. | |||
Tensors can relate vectors of different dimensionality, as in the relation: | |||
:<math> \begin{pmatrix} | |||
p_1\\ | |||
p_2\\ | |||
p_3 | |||
\end{pmatrix} | |||
= | |||
\begin{pmatrix} | |||
T_{11} & T_{12} &T_{13}&T_{14}&T_{15}\\ | |||
T_{21} & T_{22} &T_{23}&T_{24}&T_{25}\\ | |||
T_{31} & T_{32} &T_{33}&T_{34}&T_{35} | |||
\end{pmatrix} | |||
\ | |||
\begin{pmatrix} | |||
q_1\\ | |||
q_2\\ | |||
q_3\\ | |||
q_4\\ | |||
q_5 | |||
\end{pmatrix} </math> | |||
[http://books.google.com/books?id=gJA2oahuPSMC&printsec=frontcover&dq=tensor&hl=en&ei=orYKTZmeA4y-sQPN5NjBCg&sa=X&oi=book_result&ct=result&resnum=9&ved=0CE8Q6AEwCDgK#v=onepage&q&f=false Young, p 308] | |||
[http://books.google.com/books?id=aWWWyXthnq8C&printsec=frontcover&dq=tensor&hl=en&ei=WsgKTdDEE5P6sAOh46T9Cg&sa=X&oi=book_result&ct=result&resnum=6&ved=0CEUQ6AEwBTgU#v=onepage&q&f=false Akivis p. 55] | |||
[http://books.google.com/books?id=7xRlVTVSNpQC&printsec=frontcover&dq=tensor&hl=en&ei=WsgKTdDEE5P6sAOh46T9Cg&sa=X&oi=book_result&ct=result&resnum=7&ved=0CEwQ6AEwBjgU#v=onepage&q&f=false p1] | |||
[http://books.google.com/books?id=pgCx01lds9UC&printsec=frontcover&dq=tensor&hl=en&ei=WsgKTdDEE5P6sAOh46T9Cg&sa=X&oi=book_result&ct=result&resnum=10&ved=0CF8Q6AEwCTgU#v=onepage&q&f=false p6] | |||
[http://books.google.com/books?id=gWPH3e-xYHMC&pg=PA1&dq=tensor&hl=en&ei=IMoKTbCHH5OssAOiobWSCg&sa=X&oi=book_result&ct=result&resnum=4&ved=0CDYQ6AEwAzge#v=onepage&q&f=false tensor algebra p. 1] | |||
[http://books.google.com/books?id=-4baDJnuH-sC&pg=PA1&dq=tensor&hl=en&ei=IMoKTbCHH5OssAOiobWSCg&sa=X&oi=book_result&ct=result&resnum=7&ved=0CEYQ6AEwBjge#v=onepage&q&f=false intro] | |||
[http://books.google.com/books?id=oTeGXkg0tn0C&printsec=frontcover&dq=tensor&hl=en&ei=_coKTZ-KG4X2tgOAtvzVCg&sa=X&oi=book_result&ct=result&resnum=3&ved=0CDMQ6AEwAjgo#v=onepage&q&f=false p. 427; ch 14] | |||
[http://books.google.com/books?id=KCgZAQAAIAAJ&pg=PA58&dq=tensor&hl=en&ei=tcsKTbSvDIK8sQPkxNnYCg&sa=X&oi=book_result&ct=result&resnum=8&ved=0CFAQ6AEwBzgy#v=onepage&q=tensor&f=false Weyl] | |||
[http://books.google.com/books?id=14fn03iJ2r8C&pg=PA145&dq=tensor&hl=en&ei=IcwKTdu9IY_CsAPyj-GUCg&sa=X&oi=book_result&ct=result&resnum=5&ved=0CD4Q6AEwBDhG#v=onepage&q=tensor&f=false What is a tensor] [http://books.google.com/books?id=LVTYjmcdvPwC&pg=PA10&dq=negative++%22cyclic+order%22&hl=en&ei=zNUlTbbaBY34sAPdtb3_AQ&sa=X&oi=book_result&ct=result&resnum=5&ved=0CDQQ6AEwBA#v=onepage&q=negative%20%20%22cyclic%20order%22&f=false tensor as operator] |
Latest revision as of 03:07, 22 November 2023
The account of this former contributor was not re-activated after the server upgrade of March 2022.
Tensor
In physics a tensor in its simplest form is a proportionality factor between two vector quantities that may differ in both magnitude and direction, and which is a relation that remains the same under changes in the coordinate system. Mathematically this relationship in some particular coordinate system is:
or, introducing unit vectors êj along the coordinate axes:
where v is a vector with components {vj} and w is another vector with components {wj} and the quantity = {χij} is a tensor. Because v and w are vectors, they are physical quantities independent of the coordinate axes chosen to find their components. Likewise, if this relation between vectors constitutes a physical relationship, then the above connection between v and w expresses some physical fact that transcends the particular coordinate system where = {χij}.
A rotation of the coordinate axes will alter the components of v and w. Suppose the rotation labeled A is described by the equation:
Then:
and
so, to be a tensor, the components of transform as:
More directly:
where v' = v because v is a vector representing some physical quantity, say the velocity of a particle. Likewise, w' = w. The new equation represents the same relationship provided:
This example is a second rank tensor. The idea is extended to third rank tensors that relate a vector to a second rank tensor, as when electric polarization is related to stress in a crystal, and to fourth rank tensors that relate two second rank tensors, and so on.
Tensors can relate vectors of different dimensionality, as in the relation:
Young, p 308 Akivis p. 55 p1 p6 tensor algebra p. 1 intro p. 427; ch 14 Weyl What is a tensor tensor as operator