A $\nu$- support vector quantile regression model with automatic accuracy control

The estimation of f τ( x) is difficult but, more informative than estimation of only mean regression f ( x). The estimation of f τ( x) for different values of τ can briefly describe the different characteristics of the conditional distribution of y/x . In many real world problems, the estimation of mean regression f ( x) is not required or enough, rather they require the estimation of quantile f τ(x). The study of quantile regression problem has initially been started in 1978 by Koenkar and Bassett[1]. Later, it has been briefly discussed and described by Koenker in his book (Koenker, [2]). Koenkar and Bassett [1] proposed the pinball loss function for the estimation of the quantile function f τ(x). For a given quantile τ (0, 1), the pinball loss function was an asymmetric loss function suitable for quantile estimation. It was given by P τ( u) null τu if u 0, (τ 1)u otherwise.