A vector is drawn as an arrow, a covector (one-form) as a series of parallel lines. Is there a way to pictorially represent a tensor of rank greater than one? I want to have an intuitive/geometric sense of what it means to parallel transport such an object, and without a picture I don’t have one.
Phlogistonian
Jun7-08, 01:08 AM
The outer product of two vectors is a simple tensor.
u^a v^b = w^{ab}
So for visualization purposes, you can imagine a tensor as a pair of arrows emanating from the same point.
lbrits
Jun7-08, 02:11 AM
The book Gravitation, by Misner, Thorne, Wheeler, discusses this ad nauseam. I recommend you take a look at that.
tiny-tim
Jun7-08, 05:06 AM
Yeah … MTW really rocks on this! :smile:
snoopies622
Jun7-08, 10:11 PM
Thanks; I just happen to have that massive book on loan from the UNH physics library right now. I like Phlogistonian's idea, too. I guess if a (2,0) tensor can be imagined as a pair of arrows emanating from the same point then a (0,2) tensor like the metric tensor can be visualized as two overlapping sets of parallel lines that curve along with the coordinate system, although I suspect that there are limitations to such things...
zpconn
Jun13-08, 01:26 AM
a covector (one-form) as a series of parallel lines.
I've never known much about visualizing tensors. Could someone explain how this visualization works? It's obvious that a vector can be thought of as an arrow, but I'm not sure how a covector would be a series of parallel lines to be honest.
One visualization I am familiar with applies only to differential n-forms. It grows out of integration theory. Basically, you think of an n-form as being the sort of "density" or volume element that you would integrate over a manifold.
robphy
Jun13-08, 06:58 AM
Check out my poster
"Visualizing Tensors"
at
www.opensourcephysics.org/CPC/abstracts_contributed.html (http://www.opensourcephysics.org/CPC/abstracts_contributed.html)
lbrits
Jun13-08, 12:13 PM
I've never known much about visualizing tensors. Could someone explain how this visualization works? It's obvious that a vector can be thought of as an arrow, but I'm not sure how a covector would be a series of parallel lines to be honest.
One visualization I am familiar with applies only to differential n-forms. It grows out of integration theory. Basically, you think of an n-form as being the sort of "density" or volume element that you would integrate over a manifold.
Well, not really parallel lines, but parallel surfaces. Think of the function f(x). The gradient df or \nabla f defines a one-form, and if you contract with a vector \vec{v}, you get the directional derivative of f in the direction pointed by \vec{v}.
If you take a curve with tangent vector \vec{v}(\lambda) and you integrate \langle df, \vec{v} \rangle along the curve, then by the fundamental theorem of calculus, you are integrating df/d\lambda, or how much f changes. Now think of surfaces f(x) = const, where each surface is evaluated for a different constant, and the constants are say, 1 unit apart. The integral you just computed tells you how many surfaces you have to cross as you move along the curve. MTW calls this "bongs of a bell" but anyway. So people visualize covectors, oneforms of the form df, as stacked surfaces, like layers of an onion.
zpconn
Jun13-08, 03:49 PM
Very nice. That's a neat way of doing it. But am I right in supposing it only works for exact forms (since you visualize it as the level surfaces of a function f such that the one-form is given by df)?
lbrits
Jun13-08, 03:57 PM
Yup.
robphy
Jun13-08, 08:48 PM
Very nice. That's a neat way of doing it. But am I right in supposing it only works for exact forms (since you visualize it as the level surfaces of a function f such that the one-form is given by df)?
It can always work locally.
lbrits
Jun13-08, 08:58 PM
It can always work locally.
If said 1-form is not closed...? What is \omega = y\, dx the differential of?
Hurkyl
Jun13-08, 09:28 PM
If said 1-form is not closed...? What is \omega = y\, dx the differential of?
I think he means pointwise (e.g. draw the pictures in the tangent space at the point of interest), rather than being perfectly accurate within an entire open neighborhood.
MeJennifer
Jun22-08, 02:18 PM
Check out my poster
"Visualizing Tensors"
at
www.opensourcephysics.org/CPC/abstracts_contributed.html (http://www.opensourcephysics.org/CPC/abstracts_contributed.html)
Very nice!
Do you have a pdf where the individual pages are separated?
robphy
Jun22-08, 03:21 PM
Very nice!
Do you have a pdf where the individual pages are separated?
Thanks.
Sorry... I don't have that with letter-size pages.
...but here is an early version:
physics.syr.edu/~salgado/papers/VisualTensorCalculus-AAPT-01Sum.pdf (http://physics.syr.edu/~salgado/papers/VisualTensorCalculus-AAPT-01Sum.pdf)