Title :
Exact Interpolation and Learning in Quadratic Neural Networks
Author :
Georgiou, George M.
Author_Institution :
California State Univ., San Bernardino
Abstract :
A quadratic matrix mapping scheme is presented where exact interpolation for a set of input vectors is achieved. Analogies are drawn with radial-basis function (RBF) neural networks. The environment of definition is the complex domain, with the real domain being a special case. The network is further defined for the integers where it acts as a perfect hashing function. This network can be trained with gradient descend, the perceptron algorithm and a novel matrix pseudoinverse method. The XOR problem is solved in a variety of ways. The weights of the output neuron are fixed; they are the inputs themselves.
Keywords :
cryptography; file organisation; interpolation; learning (artificial intelligence); perceptrons; radial basis function networks; XOR problem; exact interpolation; learning; matrix pseudoinverse method; perceptron algorithm; perfect hashing function; quadratic matrix mapping; quadratic neural networks; radial basis function; Biological system modeling; Cells (biology); Computer science; Equations; Intelligent networks; Interpolation; Neural networks; Neurons; Radial basis function networks;
Conference_Titel :
Neural Networks, 2006. IJCNN '06. International Joint Conference on
Conference_Location :
Vancouver, BC
Print_ISBN :
0-7803-9490-9
DOI :
10.1109/IJCNN.2006.246685
