I have two arrays, say A={1, 2, 3}
and B={2, 4, 8}
(array item count and numbers may vary). How do I find a bijection between the arrays.
In this case, it would be f:A>B; f(x)=2^(x)
I have two arrays, say In this case, it would be 


As others have remarked, this problem is illdefined. Other possible functions that give the same results are (among probably infinite others): (8 x)/3  x^2 + x^3/3, x + (37 x^2)/18  (4 x^3)/3 + (5 x^4)/18, and (259 x^3)/54  (31 x^4)/9 + (35 x^5)/54. I found these solutions using:
Sometimes not all of the a[i]'s are fully determined and you may come up with values of your own. [tip: better not use variables starting with a capital letter in Mathematica so as not to get into conflict with reserved words] 


I don't think this problem has a general solution. You may try FindSequenceFunction, but it will not always find the solution. For the case at hand, you'd need a bit longer lists:
but
You can also play with



Since you tag Mathematica, I'll use Mathematica functions as a reference. If you are interested in an arbitrary fit of your data with a smooth function, you can use Interpolation. E.g.
Interpolation uses piecewise polynomials. You can do the same in your favorite programming language if you happen know or are willing to learn a bit about numerical methods, especially BSplines. If instead you know something about your data, e.g. that it is of the form c d^x, then you can do a minimization to find the unknowns (c and d in this case). If your data is in fact generated from the form c d^x, then the fit will be fairly, otherwise it's the error is minimized in the leastsquares sense. So for your data:
reports:
Indicating that your function is 2^x, just as you knew all along. 

