Deviation of an approximating function

The distance $\rho(g,f)$ between the approximating function $g\in K$ and a given function $f\in\mathfrak M$. In one and the same class $\mathfrak M$ different metrics $\rho$ may be considered, e.g. the uniform metric

$$\rho(g,f)=\max_{a\leq x\leq b}|g(x)-f(x)|,$$

an integral metric

$$\rho(g,f)=\left(\int\limits_a^b|g(x)-f(x)|^pdx\right)^{1/p},\quad p\geq1,$$

and other metrics. As the class $K$ of approximating functions one may consider algebraic polynomials, trigonometric polynomials and also partial sums of orthogonal expansions of $f$ in an orthogonal system, linear averages of these partial sums as well as a number of other sets.

References