# Integration of special functions

Posted 8 years ago
3930 Views
|
2 Replies
|
1 Total Likes
|
 integral (0,Z) { e^(ax)I0(a2x)I0(a3(Z-x)}, where I0 is the zeroth order modified bessel function of first kind? please help me...
2 Replies
Sort By:
Posted 8 years ago
 Based on these In[1]:= Integrate[E^(a x) BesselI[0, a2 x] BesselI[0, a3 (z - x)], {x, 0, z}] Out[1]= Integrate[E^(a x) BesselI[0, a2 x] BesselI[0, a3 (-x + z)], {x, 0, z}] In[2]:= Integrate[E^(1 x) BesselI[0, 1 x] BesselI[0, 1 (z - x)], {x, 0, z}] Out[2]= Integrate[E^(x) BesselI[0, x] BesselI[0, -x + z], {x, 0, z}] In[3]:= Integrate[BesselI[0, 1 x] BesselI[0, 1 (z - x)], {x, 0, z}] Out[3]= Integrate[BesselI[0, x] BesselI[0, -x + z], {x, 0, z}] In[4]:= Integrate[E^(1 x) BesselI[0, 1 (z - x)], {x, 0, z}] Out[4]= Integrate[E^(1 x)] BesselI[0, -x + z], {x, 0, z}] I don't think Mathematica is going to find a solution without outside help. Asserting your coefficients are negative does not help.Note: When the output is the same as the input this indicates that Mathematica was not able to find a solution to the problem.
Posted 8 years ago
 I found lot of formulae except for this in table of integrals text book (I.S Gradstyne), i hope we have a formula in terms of hypergeometric functions. if only i know the formula i can go forth in my masters project