# Integral involving Bessel function

Is there any way to get sympy to perform this integral?

``````x=var('x')
L=var('L')
Q.positive(1/L)
integrate(besseli(1,x) * exp(-x**2/(4*L)-L),(x,0,inf))
``````

Sympy just returns the integral:

``````Integral(exp(-L - x**2/(4*L))*besseli(1, x), (x, 0, +inf))
``````

Mathematica does it:

``````Integrate[BesselI[1, x] Exp[-(x^2/(4 L)) - L], {x, 0, Infinity}]
``````

Result:

``````ConditionalExpression[1 - E^-L, Re[1/L] > 0]
``````

EDIT: using the answer provided below, a better way to perform this integral is:

``````L=var('L',real=True,positive=True)
x=var('x',real=True,positive=True)
integrate(besseli(1,x) * exp(-x**2/(4*L)-L),(x,0,oo))
``````
-
Sympy gives me the right thing. What version are you running? – Lucas Jun 4 '13 at 4:20
`\$ python -c "import sympy; print sympy.__version__" 0.7.2` What version are you using? Maybe I need the latest dev version? – keflavich Jun 4 '13 at 15:52
Infinity in SymPy is `oo`, not `inf`. – asmeurer Jun 4 '13 at 16:21
This works for me in 0.7.2 (after changing `inf` to `oo`). – asmeurer Jun 4 '13 at 16:22
0.7.2-git (and I changed inf to oo as asmeurer mentioned) – Lucas Jun 4 '13 at 21:16

The problem is that you are using `inf`, which I guess is `Float('inf')`. You want `oo`, the symbolic infinity. SymPy should probably be smarter about converting `Float('inf')` to `oo`.

``````In [1]: x=var('x')

In [2]: L=var('L')

In [3]: Q.positive(1/L)
Out[3]: Q.positive(1/L)

In [5]: integrate(besseli(1,x) * exp(-x**2/(4*L)-L),(x,0,oo))
Out[5]:
⎧        ⎛ L    ⎞  -L              │                 ⎛      1         ⎞│   π
⎪        ⎝ℯ  - 1⎠⋅ℯ            for │periodic_argument⎜─────────────, ∞⎟│ < ─
⎪                                  │                 ⎝polar_lift(L)   ⎠│   2
⎪
⎪∞
⎪⌠
⎨⎮         2
⎪⎮        x
⎪⎮  -L - ───
⎪⎮       4⋅L
⎪⎮ ℯ        ⋅besseli(1, x) dx                    otherwise
⎪⌡
⎩0
``````
-
I opened code.google.com/p/sympy/issues/detail?id=3866 for the `inf` vs. `oo` thing. – asmeurer Jun 4 '13 at 16:26
Thanks! How do you generate the pretty-print output? – keflavich Jun 4 '13 at 16:52
`pprint`, or do it automatically with `init_printing`. I am using `isympy`, which does that automatically. – asmeurer Jun 4 '13 at 17:37
The periodic_argument polar_lift stuff is probably equivalent to `re(1/L) > 0`. You can read the docstrings of those respective functions to see what they mean. Unfortunately, SymPy right now is very bad at simplifying the conditionals that come out of integrate, so you sometimes have to do it by hand. – asmeurer Jun 4 '13 at 17:38