In this paper, we modify the classical Kantorovich operators, very well known in Approximation Theory, by considering p-averages (whose expressions are of the form of L-p (quasi-)norms, p > 0). We establish convergence results, an asymptotic formula covering the general setting; moreover, we show that, under suitable assumptions, our operators perform better than the classical Kantorovich ones in approximating functions. Because of the nature of the p-averages, the proposed operators are nonlinear, so their study turns out to be more challenging.
Cappelletti Montano, M., Corso, R., Leonessa, V. (2026). A nonlinear version of Kantorovich operators with p-averages: convergence results and asymptotic formula. ANALYSIS AND MATHEMATICAL PHYSICS, 16(3) [10.1007/s13324-026-01178-7].
A nonlinear version of Kantorovich operators with p-averages: convergence results and asymptotic formula
Corso R.
;
2026-04-03
Abstract
In this paper, we modify the classical Kantorovich operators, very well known in Approximation Theory, by considering p-averages (whose expressions are of the form of L-p (quasi-)norms, p > 0). We establish convergence results, an asymptotic formula covering the general setting; moreover, we show that, under suitable assumptions, our operators perform better than the classical Kantorovich ones in approximating functions. Because of the nature of the p-averages, the proposed operators are nonlinear, so their study turns out to be more challenging.
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