Affiliation:
1. Department of Mathematics Indian Institute of Technology Roorkee Roorkee India
2. Department of Mathematics University of Prishtina “Hasan Prishtina” Prishtina Kosovo
Abstract
In the present article, we introduce a Kantorovich variant of the neural network interpolation operators activated by smooth ramp functions proposed by Qian and Yu (2022). We discuss the convergence of these operators in the spaces,
and
, and establish some direct approximation theorems. Further, we derive the converse results by means of Berens–Lorentz lemma and Peetre's K‐functional. We present a multivariate version of the aforementioned Kantorovich neural network interpolation operators and investigate the direct and converse results in the continuous and
, spaces.