Degree of Approximation of Order Statistics Functionals, Dependent Case

Using approximation theory methods, we investigate the rate of convergence of expected L-estimates to a non-trivial associated integral limit in the d.i.d. case. We produce quantitative results in many different settings; their related inequalities are sharp and give the degree of approximation of the associated non-positive linear functionals to the above fixed limit. The involved weight functions carry minimal smoothness assumptions.