# descontinuous initial data [closed]

I have a discontinuous function like

``````f(x)=0.5(exp(-80x^2)+1) if -0.3<x<-0.1
``````

and

``````f(x)=0.5exp(-80x^2) otherwise,
``````

with the domain 0 ≤ x ≤ 1.

How to define it as inline function in MatLab?

-
Hmm.. nice mathematical function you have there. wait, where's the question? –  mauris Feb 11 '10 at 9:47
looks continuous to me... –  Mitch Wheat Feb 11 '10 at 9:54
I am dying to know what happens if you don't have -0.3 :) –  Hannes Ovrén Feb 11 '10 at 9:54
See? Improper format kills questions. –  KennyTM Feb 11 '10 at 10:11

## closed as not a real question by mauris, leepowers, Naveen, KennyTM, George Stocker♦Feb 11 '10 at 18:44

It's difficult to tell what is being asked here. This question is ambiguous, vague, incomplete, overly broad, or rhetorical and cannot be reasonably answered in its current form. For help clarifying this question so that it can be reopened, visit the help center.If this question can be reworded to fit the rules in the help center, please edit the question.

Since the OP poses the domain as 0 <= x <= 1, then the answer is simply to use the positive branch! There is no need to worry about the value when x is negative.

Next, I would suggest that you do NOT use an inline function at all. Inline functions are slow. Use them only if your matlab release is so old that you cannot define a function handle. So then

``````f = @(x) 0.5*exp(-80*x.^2);
``````

If you must define an inline function, then I'd really suggest you get a newer version of matlab. If you still refuse to enter the current century, then do this:

``````f = inline('0.5*exp(-80*x.^2)','x');
``````

There is one other possibility, and that is you have also screwed up the domain of the function. If the domain of the function is not strictly 0 <= x <= 1 so that negative values can occur, then we might need to worry about the discontinuous nature of the function. Here you can use something like piecewise_eval, as posted on the MATLAB Central File Exchange. This tool allows you to build and evaluate piecewise functions, and you could build it into either an inline function or an anonymous function/function handle as desired. Thus, this expression will build a function handle for your purpose:

``````f = @(x) piecewise_eval(x,[-.3, -.1], ...
{@(x) 0.5*exp(-80*x.^2), ...
@(x) 0.5*(exp(-80*x.^2) + 1), ...
@(x) 0.5*exp(-80*x.^2)});
``````

One other thing to beware of is what happens at the break points themselves. The piecewise_eval function assumes that a point will lie inside half open intervals, such as:

``````-0.3 <= x < -0.1
``````

for the middle branch of your function. This is fairly standard in most such definitions of piecewise functions.

-
``````y = inline('0.5*(exp(-80*x^2) + (-0.3 < x && x < -0.1))', 'x')