One-sided weighted integral approximation of characteristic functions of intervals by polynomials on a closed interval

Abstract: Abstract-We consider the problem of one-sided weighted integral approximation on the interval [−1, 1] to the characteristic functions of intervals (a, 1] ⊂ (−1, 1] and (a, b) ⊂ (−1, 1) by algebraic polynomials. In the case of half-intervals, the problem is solved completely. We construct an example to illustrate the difficulties arising in the case of an open interval.

“…in what follows, we sometimes will use more accurate (in comparison with (2.2)) notation for nodes is the left and right Radau quadrature formula, respectively; in the case u = {−1, 1}, (2.7) is the Lobatto quadrature formula. It is known (see the references in [1,3,5]) that formula (2.7) is positive in all these cases.…”

“…In this section, we give results from [1,5,11] on the one-sided approximation in the space L υ (−1, 1) to the characteristic function of an interval by algebraic polynomials. The results from Section 1 and from this sections make it possible to find the best one-sided approximation in the space L(S m−1 ) to the characteristic function of a spherical layer (in particular, a spherical cap) by algebraic polynomials in certain situations.…”

“…Problems of one-sided weighted integral approximation to the characteristic function of an interval and to similar functions by algebraic or trigonometric polynomials arise in various areas of mathematics and have a rich history (see [1,2,5,6,11,14,16,17] and the references therein). Let us outline only several exact results on problem (2.4) closely related to the present paper; for a more complete presentation of the topic see [1,11]. Problem (2.4) of one-sided integral approximation to the characteristic function of an arbitrary half-open interval (a, 1] ⊂ (−1, 1] by algebraic polynomials on [−1, 1] with the unit weight was solved, and the whole class of extremal polynomials was described in [5].…”

“…Problem (2.4) of one-sided integral approximation to the characteristic function of an arbitrary half-open interval (a, 1] ⊂ (−1, 1] by algebraic polynomials on [−1, 1] with the unit weight was solved, and the whole class of extremal polynomials was described in [5]. This problem in the space L υ (−1, 1) with an arbitrary weight is solved in [1]. Let us describe the main result of [1] in the form convenient for us.…”

“…This problem in the space L υ (−1, 1) with an arbitrary weight is solved in [1]. Let us describe the main result of [1] in the form convenient for us.…”

One-Sided L-Approximation on a Sphere of the Characteristic Function of a Layer

“…in what follows, we sometimes will use more accurate (in comparison with (2.2)) notation for nodes is the left and right Radau quadrature formula, respectively; in the case u = {−1, 1}, (2.7) is the Lobatto quadrature formula. It is known (see the references in [1,3,5]) that formula (2.7) is positive in all these cases.…”

“…In this section, we give results from [1,5,11] on the one-sided approximation in the space L υ (−1, 1) to the characteristic function of an interval by algebraic polynomials. The results from Section 1 and from this sections make it possible to find the best one-sided approximation in the space L(S m−1 ) to the characteristic function of a spherical layer (in particular, a spherical cap) by algebraic polynomials in certain situations.…”

“…Problems of one-sided weighted integral approximation to the characteristic function of an interval and to similar functions by algebraic or trigonometric polynomials arise in various areas of mathematics and have a rich history (see [1,2,5,6,11,14,16,17] and the references therein). Let us outline only several exact results on problem (2.4) closely related to the present paper; for a more complete presentation of the topic see [1,11]. Problem (2.4) of one-sided integral approximation to the characteristic function of an arbitrary half-open interval (a, 1] ⊂ (−1, 1] by algebraic polynomials on [−1, 1] with the unit weight was solved, and the whole class of extremal polynomials was described in [5].…”

“…Problem (2.4) of one-sided integral approximation to the characteristic function of an arbitrary half-open interval (a, 1] ⊂ (−1, 1] by algebraic polynomials on [−1, 1] with the unit weight was solved, and the whole class of extremal polynomials was described in [5]. This problem in the space L υ (−1, 1) with an arbitrary weight is solved in [1]. Let us describe the main result of [1] in the form convenient for us.…”

“…This problem in the space L υ (−1, 1) with an arbitrary weight is solved in [1]. Let us describe the main result of [1] in the form convenient for us.…”

One-Sided L-Approximation on a Sphere of the Characteristic Function of a Layer

Best One-Sided Approximation in the Mean of the Characteristic Function of an Interval by Algebraic Polynomials