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There was a question on mathgroup, and while I was looking at it, I noticed this thing, and I can't understand why, I thought some expert here would know.

When doing Dt [ x[1] ]

it gives zero, because during evaluation of x[1], the last value left is 1, as can be seen from the TracePrint below. And hence '1' is what is seen by Dt, and so Dt[1] is 0.

Hence Dt[ x[1] ] is zero

In[86]:= TracePrint[ Dt[x[1] ]]

During evaluation of In[86]:=  Dt[x[1]]
During evaluation of In[86]:=   Dt
During evaluation of In[86]:=   x[1]
During evaluation of In[86]:=    x
During evaluation of In[86]:=    1
During evaluation of In[86]:=  0

Out[86]= 0

That made sense to me, until I typed x[1], and got back x[1]

In[84]:= x[1] Out[84]= x[1]

But x[1] returning x[1] also made sense to me, since x[1] has no value, so it should return unevaluated.

So, my question, is why it seems that x[1] was evaluated all the way down to '1' during the call above, but at the top level notebook interface, it did not evaluate to 1?

In[87]:= Evaluate[ x[1] ]
Out[87]= x[1]


share|improve this question
up vote 5 down vote accepted

The expression


does not evaluate to 1 - it is an indexed variable with undefined value. The problem is that when you use the form of Dt with 1 argument, then x is considered a function, and 1 - its argument, and you get 0. This becomes clearer when you consider

In[1]:= Dt[x[y]]

Out[1]= Dt[y] Derivative[1][x][y]

If you now use

In[2]:= Dt[x[1],x[1]]

Out[2]= 1

you get 1, since now you differentiate over x[1] considered as a variable. Or,

In[3]:= Dt[x[1]^2, x[1]]

Out[3]= 2 x[1]

You were confused by evaluation printout since indeed, when evaluating an expression, all parts are normally evaluated - but (in the absense of any rules for x), x[1] evaluates back to itself also inside Dt, to be sure. What you observed is related to how Dt with one argument interprets that argument.

share|improve this answer
@Nasser I added an illustration to the top of my post (even before reading your comment) - Dt[x[y]] (which does not return zero for general y). Now, for Dt[x[1]], it is computed as x'[1] Dt[1], but Dt[1] is zero since 1 is a constant, thus the overall result. Once again: x[1] evaluated to itself all right, but then D[x[1]] evaluated and resulted in 0. – Leonid Shifrin Jun 1 '11 at 10:37
btw, I just want to say how great Stackoverflow forum is, the person who asked this question on the mathgroup will not get the correct answer for 2-3 days, but here, the experts answered in few minutes ! I saw this question on Mathgroup and answered it, but I do not think I did a good job :) – Nasser Jun 1 '11 at 10:39
@Nasser While Mathgroup has its strengths and is an excellent forum, I agree that SO offers more advanced functionality in many ways, and has a much faster turnaround. But I think, what really makes it great is that, with all its tools taken together, it facilitates another level of collaboration, so each answer here is really a collaborative product, while on more traditional forums you have a collection of individual (often duplicate, sometimes conflicting) answers. – Leonid Shifrin Jun 1 '11 at 10:45
@Nasser I think the current state of the SO Mathematica forum here is quite healthy. It is rapidly evolving, but not too rapidly, so that we have a biological growth rather than a chaotic expansion. A big inflow of students with very basic questions could bring more harm than good at the moment, since it may lower the level of question quality and distract people here. I'd just let it go as it goes, and once the community and the number of answered questions gets larger, more questions can be effectively handled. Those who really need us, will find us, like you did. My two cents. – Leonid Shifrin Jun 1 '11 at 11:09
@Sjoerd I think it is great that you did it on Mathgroup, but are you sure our SO community here is ready to handle a rapid growth of a number of basic questions (I mean not Mathgroup posters, more basic)? Most new users here so far have been doing their homework and ask only after they tried something themselves, and part of that I think is due to us not being quite on the surface - people needed some motivation to find us. If a really large crowd of people with very basic questions comes within a very short period of time, that can be a hard burden to our community - or am I totally off? – Leonid Shifrin Jun 1 '11 at 11:15

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