Neural network integral representations with the ReLU activation function

We derive a formula for neural network integral representations on the sphere with the ReLU activation function under the finite $L_1$ norm (with respect to Lebesgue measure on the sphere) assumption on the outer weights. In one dimensional case, we further solve via a closed-form formula all possible such representations. Additionally, in this case our formula allows one to explicitly solve the least $L_1$ norm neural network representation for a given function.