Universal Approximation Theorem for Input-Connected Multilayer Perceptrons
Abstract
We present the Input-Connected Multilayer Perceptron (IC-MLP), a feedforward neural network architecture in which each hidden neuron receives, in addition to the outputs of the preceding layer, a direct affine connection from the raw input. We first study this architecture in the univariate setting and give an explicit and systematic description of IC-MLPs with an arbitrary finite number of hidden layers, including iterated formulas for the network functions. In this setting, we prove a universal approximation theorem showing that deep IC-MLPs can approximate any continuous function on a closed interval of the real line if and only if the activation function is nonlinear. We then extend the analysis to vector-valued inputs and establish a corresponding universal approximation theorem for continuous functions on compact subsets of .
Keywords
Cite
@article{arxiv.2601.14026,
title = {Universal Approximation Theorem for Input-Connected Multilayer Perceptrons},
author = {Vugar Ismailov},
journal= {arXiv preprint arXiv:2601.14026},
year = {2026}
}
Comments
19 pages, 2 figures, 32 references; minor corrections and an added reference