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))
```

`$ python -c "import sympy; print sympy.__version__" 0.7.2`

What version areyouusing? Maybe I need the latest dev version? – keflavich Jun 4 '13 at 15:52`oo`

, not`inf`

. – asmeurer Jun 4 '13 at 16:21`inf`

to`oo`

). – asmeurer Jun 4 '13 at 16:22