what is the best approach to generate random samples from bivariate normal and student T distributions? In both cases sigma is one, mean 0  so the only parameter I am really interested in is correlation (and degrees of freedom for student t). I need to have the solution in C++, so I can't unfortunately use already implemented functions from MatLab or Mathematica.

You can use the GNU GSL libraries. See here for Bivariate normal: http://www.gnu.org/software/gsl/manual/html_node/TheBivariateGaussianDistribution.html and Student's tdistribution here: http://www.gnu.org/software/gsl/manual/html_node/Thet_002ddistribution.html They are straight forward to use. 


You should take a look at the Boost libraries random distributions  see http://www.boost.org/doc/libs/1_41_0/libs/random/randomdistributions.html. I've found them very easy to use, once you wrap your head around their basic concepts. Unfortunately, I don't know enough about statistics to tell you whether they will exactly meet your needs. 


For a bivariate normal with covariance unity and zero mean, just draw two univariate normals. If you want to draw a bivariate normal with means (m1, m2), standard deviations (s1, s2) and covariance rho, then draw two unit univariate normals X and Y and set
Then u and v are distributed as you wish. For the Student T, you have to draw a normal variate N and a chi^2 variate V. Then, N / sqrt(V) has T distribution. To draw the chi^2, you should use a package. Or have a look at Numerical Recipes chapter 7 for how to draw from a Gamma distribution (xhi^2 is a special case of Gamma). 

