# plot a multiple rule function in mathematica

How can I write the code for a function (complex contour) similar to this in Mathematica:

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Allow me to welcome you to StackOverflow and remind three things we usually do here: 1) As you receive help, try to give it too answering questions in your area of expertise 2) `Read the FAQs` 3) When you see good Q&A, vote them up by `using the gray triangles`, as the credibility of the system is based on the reputation that users gain by sharing their knowledge. Also remember to accept the answer that better solves your problem, if any, `by pressing the checkmark sign` –  belisarius Jul 21 '11 at 16:03
Not clear to me what you mean by a "function". Are you wanting to parametrize a contour for, say, purposes of numeric or symbolic integration? Daniel Lichtblau –  Daniel Lichtblau Jul 21 '11 at 16:36
@Daniel: I should have read your comment before I simply created the graphics.... –  Simon Jul 22 '11 at 1:02
@belisarius: You are right. I will try not forget to credit answers. –  asd Jul 22 '11 at 8:41
@asd Have a look at Piecewise[] in the Documentation Center. Daniel Lichtblau –  Daniel Lichtblau Jul 22 '11 at 16:59

The most direct way is to use graphics primatives (although I think I prefer Felix's `PolarPlot` solution)

``````With[{q = Pi/6},
Graphics[{Circle[{0, 0}, 1, {q, 2 Pi - q}],
Arrow[{{Cos[q] + 2, Sin[q]}, {Cos[q], Sin[q]}}],
Arrow[{{Cos[q], Sin[-q]}, {Cos[q] + 2, Sin[-q]}}],
FontSize -> Medium, Text["\[ScriptCapitalC]", {2, Sin[q]}, {0, -2}]},
Axes -> True, PlotRange -> {{-4, 6}, {-4, 4}}]]
``````

I guess if you want the actual function for contour, then maybe something like

``````contour[t_, t0_: (5 Pi/6)] := Piecewise[{
{Exp[I (t + Pi)], -t0 < t < t0},
{t - t0 + Exp[I (t0 + Pi)], t >= t0},
{-t - t0 + Exp[-I (t0 + Pi)], t <= -t0}}]

ParametricPlot[Through[{Re, Im}[contour[t]]], {t, -8, 8}, PlotPoints -> 30]
``````

And to add arrows to this plot, I guess you'd have to add them in manually (using `Epilog` or the drawing tools) or use one of the packages that modifies the built-in plots.

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I am not exactly sure what c is, but I assumed it was a number between 0 and 1 meaning the height of the incoming straight line. So maybe somehting like this would suit your needs?

``````c = 0.7;
t0 = ArcSin[c];
PolarPlot[If[Abs[t] < t0, Abs[Sin[t0]/Sin[t]], 1], {t, -\[Pi], \[Pi]}]
``````
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I'd guess `c` is just a label (it's the contour of integration c, as it's usually called in books etc). You could very easily add arrows to your contour using this package: users.dimi.uniud.it/~gianluca.gorni/Mma/Mma.html –  acl Jul 21 '11 at 22:28
Arrow & labeling can also be added using something like the Epilog below ... Epilog -> { Arrow[{{2, c}, {1, c}}], Arrow[{{1, -c}, {2, -c}}], Arrow[{{-1, .1}, {-1, -.1}}], Text["C", {1.5, c + .1}], Text["C", {1.5, -(c + .1)}] } –  dwa Jul 21 '11 at 23:28