Resumen
The Faber-Schauder system of functions was introduced in 1910 and became the first example of a basis in the space of continuous on [0, 1] functions. A number of results are known about the properties of the Faber-Schauder system, including estimations of errors of approximation of functions by polynomials and partial sums of series in the Faber-Schauder system.It is known that obtaining new estimates of errors of approximation of an arbitrary function by some given class of functions is one of the important tasks in the theory of approximation. Therefore, investigation of the approximation properties of polynomials and partial sums in the Faber-Schauder system is of considerable interest for the modern approximation theory.The problems of approximation of functions of bounded variation by partial sums of series in the Faber-Schauder system of functions are studied. The estimate of the error of approximation of functions from classes of functions of bounded variation Cp (1=p<8) in the space metric Lp using the values of the modulus of continuity of fractional order ?2-1/p(f, t) is obtained. From the obtained inequality, the estimate of the error of approximation of continuous functions in terms of the second-order modulus of continuity follows.Also, in the class of functions Cp (1<p<8), the estimate of the error of approximation of functions in the space metric Lp using the modulus of continuity of fractional order ?1-1/p(f, t) is obtained.For classes of functions of bounded variation KCV(2,p) (1=p<8), the estimate of the error of approximation of functions in the space metric Lp by Faber-Schauder partial sums is obtained.Thus, several estimates of the errors of approximation of functions of bounded variation by their partial sums of series in the Faber-Schauder system are obtained. The obtained results are new in the theory of approximation. They generalize in a certain way the previously known results and can be used for further practical applications.