I have two double variables:
a > 0 b >= 0
which could be tiny numbers. 'a' represents singular values of a matrix and 'b' represents the Tikhonov regularization constant. As part of the Tikhonov least squares solution, it is necessary to compute the quantity:
c = a*a / (a*a + b)
However if a is really small (ie small singular values of the matrix),
a*a may not be representable in double precision. How can I compute this quotient c in a numerically stable way for the given ranges of a,b?