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I'm searching for tablecurve functionalities on Mathematica.

I like a lot the functionalities of tablecurve 2d and 3d. When looking for a function that doesn’t need any sort of "physical" justification to a given set of data, having thousands of predefined functions and an adjustment function that takes just a couple of seconds (literally) is very handy.

http://www.sigmaplot.com/products/tablecurve2d/tablecurve2d.php (There’s a trial, if you want to try it)

Does someone ever heard of any attempt to do the same in Mathematica? If I'm not mistaken, M8 has a lot of functionalities that would make this kind of program approach easy to establish (thought I'm not a specialist in this area). And once the basic functionality was set, one would just add more functions to a list, and then the adjustment of a data set to all the functions on that list would be launched, managed, sorted, etc, by the main package.

Can someone help me? Point an already existing package, or Give a small code to launch an adjustment on a set of functions, or Etc Thank you, P Fonseca

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If I understand correctly, you are asking for simultaneous calls to FindFit with a preset choice of models, forgoing any fit diagnostics ? –  Sasha May 24 '11 at 21:25
1  
Mathematica has a broad range of fit capabilities, with Fit, FindFit, LinearModelFit, NonLInearModelfit etc. Fitting to a whole set of functions should be doable, but I don't think mindless fitting data to unknown models (what tablecurve seems to do) is good science. –  Sjoerd C. de Vries May 24 '11 at 21:25
    
that is correct –  P. Fonseca May 24 '11 at 21:27
    
In a lot of cases, I'm not looking for good science. Let's suppose I've taken out a set of data points that I completely don't know it's "scientific" model. I can use an interpolation function model to use that data in a continuous function. Nevertheless, as you can imagine, a well defined function can be much more useful than the interpolation model (ex.: transfer it easily to another program). –  P. Fonseca May 24 '11 at 21:34
    
About 2 yrs ago, I personally asked that same question to Stephen Wolfram. I don't remember his exact answer, but I remember that it was something that they were looking into. –  gdelfino May 24 '11 at 22:35

1 Answer 1

up vote 3 down vote accepted

A basic recipe might be something along the following lines:

ClearAll[a, b, c, data]
data = {{0, 1}, {1, 0}, {3, 2}, {5, 4}, {6, 4}, {7, 5}};

functions =
  {
   {Log[a + b x^2], {a, b}},
   {Sin[a x], {a}},
   {1 + a x + b x^2 + c x^3, {a, b, c}}
  };

Sort[
 Table[
  nlm = NonlinearModelFit[data, functions[[i, 1]], functions[[i, 2]],x];
  {nlm["AdjustedRSquared"], nlm["BestFit"]},
  {i, Length[functions]}
  ], #1[[1]] > #2[[1]] &
 ]

==> {{0.974277, 1 - 0.996311 x + 0.541669 x^2 - 0.0461196 x^3}, 
     {0.93636, Log[1.50632 + 1.42633 x^2]}, {-0.0304978, Sin[1.23596 x]}}
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1  
Great. I will just add: output = (your Sort[Table[...]]) and then Manipulate[ Column[{output[[nb, 2]], output[[nb, 1]], Show[ListPlot[data, PlotRange -> Full], Plot[output[[nb, 2]], {x, Min[data[[All, 1]]], Max[data[[All, 1]]]}], ImageSize -> 400]}, ItemSize -> {Automatic, {3, 3, 20}}], {nb, 1, Length[output], 1}] –  P. Fonseca May 25 '11 at 6:20

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