In the multivariate nonparametric regression model Y = g(t)+ epsilon the pr
oblem of testing linearity of the regression function g and homoscedasticit
y of the distribution of the error epsilon is considered. For both problems
a simple test is derived which is based on estimating the L-2-distance bet
ween the model space and the space induced by the hypothesis. The resulting
statistics can be shown to be asymptotically normal, even under fixed alte
rnatives. This extends and unifies recent results of Dette and Munk (1998a,
b) to the multivariate case. A small simulation study on the finite sample
behaviour of the proposed tests is reported and their properties are illust
rated by analyzing a data example.