Venkataraman Muthiah-Nakarajan

Mathew Mithra Noel, Venkataraman Muthiah-Nakarajan, Yug D Oswal

Higher order artificial neurons whose outputs are computed by applying an activation function to a higher order multinomial function of the inputs have been considered in the past, but did not gain acceptance due to the extra parameters and computational cost. However, higher order neurons have significantly greater learning capabilities since the decision boundaries of higher order neurons can be complex surfaces instead of just hyperplanes. The boundary of a single quadratic neuron can be a general hyper-quadric surface allowing it to learn many nonlinearly separable datasets. Since quadratic forms can be represented by symmetric matrices, only $\frac{n(n+1)}{2}$ additional parameters are needed instead of $n^2$. A quadratic Logistic regression model is first presented. Solutions to the XOR problem with a single quadratic neuron are considered. The complete vectorized equations for both forward and backward propagation in feedforward networks composed of quadratic neurons are derived. A reduced parameter quadratic neural network model with just $ n $ additional parameters per neuron that provides a compromise between learning ability and computational cost is presented. Comparison on benchmark classification datasets are used to demonstrate that a final layer of quadratic neurons enables networks to achieve higher accuracy with significantly fewer hidden layer neurons. In particular this paper shows that any dataset composed of $\mathcal{C}$ bounded clusters can be separated with only a single layer of $\mathcal{C}$ quadratic neurons.

Matthew Mithra Noel, Shubham Bharadwaj, Venkataraman Muthiah-Nakarajan et al.

The recent discovery of special human neocortical pyramidal neurons that can individually learn the XOR function highlights the significant performance gap between biological and artificial neurons. The output of these pyramidal neurons first increases to a maximum with input and then decreases. Artificial neurons with similar characteristics can be designed with oscillating activation functions. Oscillating activation functions have multiple zeros allowing single neurons to have multiple hyper-planes in their decision boundary. This enables even single neurons to learn the XOR function. This paper proposes four new oscillating activation functions inspired by human pyramidal neurons that can also individually learn the XOR function. Oscillating activation functions are non-saturating for all inputs unlike popular activation functions, leading to improved gradient flow and faster convergence. Using oscillating activation functions instead of popular monotonic or non-monotonic single-zero activation functions enables neural networks to train faster and solve classification problems with fewer layers. An extensive comparison of 23 activation functions on CIFAR 10, CIFAR 100, and Imagentte benchmarks is presented and the oscillating activation functions proposed in this paper are shown to outperform all known popular activation functions.