Suppose we consider a  arbitrary cubic homogeneous form $f$ in  in four or five variables over the rational field. Is there any computational tool or algorithm to check this cubic homogeneous form $ f $  has any non trivial rational solution  or not ? I think for real field there is always a non trivial real solution ,we don't need any computational tool . But for rational field we can't say it has always a non zero rational  solution as  for an example  $ 5x_1^3 + 12 x_{2}^3 + 9x_3^3 + 10 x_4^3 $ does not admit a non trivial rational solution .