REFERENCES
- B. W. Mel , “Information processing in dendritic trees,” Neural Comput ., Vol. 6, no. 6, pp. 1031–85, Nov. 1994.
- C. Koch and I. Segev , “The role of single neurons in information processing,” Nat. Neurosci. , Vol. 3, no. Suppl, pp. 1171–7, Nov. 2000.
- A. Polsky , B. W. Mel , and J. Schiller , “Computational subunits in thin dendrites of pyramidal cells,” Nat. Neurosci. , Vol. 7, pp. 621–7, May 2004.
- K. Sidiropoulou , E. K. Pissadaki , and P. Poirazi , “Inside the brain of a neuron,” EMBO Rep ., Vol. 7, no. 9, pp. 886–92, Sep. 2006.
- M. Lavzin , S. Rapoport , A. Polsky , L. Garion , and J. Schiller , “Nonlinear dendritic processing determines angular tuning of barrel cortex neurons in vivo ,” Nature , Vol. 490, no. 7420, pp. 397–401, Sep. 2012.
- Y. Todo , H. Tamura , K. Yamashita , and Z. Tang , “Unsupervised learnable neuron model with nonlinear interaction on dendrites,” Neural Netw ., Vol. 60, pp. 96–103, Dec. 2014.
- T. Jiang , D. Wang , J. Ji , Y. Todo , and S. Gao , “Single dendritic neuron with nonlinear computation capacity: a case study on XOR problem,” in Proc. Int. Conf. on Progress in Informatics and Computing (PIC) , Nanjing, China, Dec. 2015, pp. 20–4.
- W. Chen , J. Sun , S. Gao , J.-J. Cheng , J. Wang , and Y. Todo , “Using a single dendritic neuron to forecast tourist arrivals to japan,” IEICE Trans. Inf. Syst. , Vol. E100–D, no. 1, pp. 190–202, Jan. 2017.
- Y. Xiong , W. Wu , X. Kang , and C. Zhang , “Training pi-sigma network by online gradient algorithm with penalty for small weight update,” Neural Comput ., Vol. 19, no. 12, 3356–68, Jan. 2008.
- C.-K. Li , “A sigma-pi-sigma neural network (SPSNN),” Neural Process. Lett. , Vol. 17, no. 1, pp. 1–19, Mar. 2003.
- N. Homma and M. M. Gupta , “A general second-order neural unit,” Bull. Coll. Med. Sci. Tohoku Univ. , Vol. 11, no. 1, pp. 1–6, Jan. 2002.
- B. K. Tripathi and P. K. Kalra , “The novel aggregation function-based neuron models in complex domain,” Soft. Comput ., Vol. 14, no. 10, pp. 1069–81, Aug. 2010.
- C. L. Giles and T. Maxwell , “Learning, invariance, and generalization in high-order neural networks,” Appl. Opt. , Vol. 26, no. 23, pp. 4972–8, 1987.
- M. Zhang , S. Xu , and J. Fulcher , “Neuron-adaptive higher order neural network models for automated financial data modeling,” IEEE Trans. Neural Netw. , Vol. 13, no. 1, pp. 188–204, Jan. 2002.
- S. Xu , “Adaptive Higher Order Neural Network Models and their Applications in Business,” in Artificial Higher Order Neural Networks for Economics and Business . Hershey, New York: IGI Global, 2009, pp. 314–29.
- E. B. Kosmatopoulos , M. M. Polycarpou , M. A. Christodoulou , and P. A. Ioannou , “High-order neural network structures for identification of dynamical systems,” IEEE Trans. Neural Netw. , Vol. 6, no. 2, pp. 422–31, Mar. 1995.
- H. Dyckhoff and W. Pedrycz , “Generalized means as model of compensative connectives,” Fuzzy Sets Syst ., Vol. 14, no. 2, pp. 143–54, Nov. 1984.
- R. R. Yager , “Generalized OWA aggregation operators,” Fuzzy Optim. Decis. Ma. , Vol. 3, no. 1, pp. 93–107, Mar. 2004.
- A. V. Ooyen and B. Nienhuis , “Improving the convergence of the backpropagation algorithm,” Neural Netw ., Vol. 5, no. 3, pp. 465–72, Jan. 1992.
- X. Chen , Z. Tang , and S. Li , “An modified error function for the complex-value backpropagation neural network,” Neural Inf. Process. , Vol. 8, no. 1, pp. 1–8, Jul. 2005.
- G. D. Magoulas , N. V. Michael , and S. A. George , “Effective backpropagation training with variable stepsize,” Neural Netw ., Vol. 10, no.1, pp. 69–82, Jan. 1997.
- T. P. Vogl , J. K. Mangis , A. K. Rigler , W. T. Zink , and D. L. Alkon , “Accelerating the convergence of the back-propagation method,” Biol. Cybern. , Vol. 59, no. 4, pp. 257–63, Sep. 1988.
- C. C. Yu and D. B. Liu , “A backpropagation algorithm with adaptive learning rate and momentum coefficient,” in Proc. IEEE Int. Jt. Conf. Neural Netw., Vol. 2, pp. 1218–23, May 2002, .
- E. Istook and T. Martinez , “Improved backpropagation learning in neural networks with windowed momentum,” Int. J. Neural Sys. , Vol. 12, no. 3 and 4, pp. 303–18, Jan. 2002.
- R. A. Jacobs , “Increased rates of convergence through learning rate adaptation,” Neural Netw ., Vol. 1, no. 4, pp. 295–307, Jan. 1988.
- A. A. Minai and R. D. Williams , “Back-propagation heuristics: a study of the extended delta-bar-delta algorithm,” in Proc. Int. Jt. Conf. Neural Netw., San Diego, CA, Jun. 1990, pp. 595–600.
- S. E. Fahlman , “An empirical study of learning speed in back-propagation networks,” Carnegie-Mellon University, Technical Report CMU-CS-88-162, 1988.
- M. Riedmiller and H. Braun , “A direct adaptive method for faster backpropagation learning: The RPROP algorithm,” in Proc. IEEE Int. Conf. Neural Netw., San Francisco, CA , Apr. 1993.
- C. Igel and M. Husken , “Empirical evaluation of the improved Rprop learning algorithms,” Neurocomputing , Vol. 50, pp. 105–23, Jan. 2003.
- C. Igel , M. Toussaint , and W. Weishui , “Rprop using the natural gradient,” in Trends and Applications in Constructive Approximation .Vol. 151, International Series of Numerical Mathematics (ISNM) , D. Mache , J. Szabados , and M. De Bruin , Eds. Basel : Birkhauser, 2005, pp. 259–72.
- B. K. Tripathi and P. K. Kalra , “On efficient learning machine with root-power mean neuron in complex domain,” IEEE Trans. Neural Netw. , Vol. 22, no. 5, pp. 727–38, May 2011.
- A. Kantsila , M. Lehtokangas , and J. Saarinen , “Complex RPROP-algorithm for neural network equalization of GSM data bursts,” Neurocomputing , Vol. 61, pp. 339–60, Oct. 2004.
- C.-S. Chen , J.-M. Lin , and C.-T. Lee , “Neural network for WGDOP approximation and mobile location,” Mathematical Problems in Engineering , Vol. 2013, pp. 11, Jun. 2013. Available: http://dx.doi.org/10.1155/2013/369694
- L. Orcik , M. Voznak , J. Rozhon , F. Rezac , J. Slachta , H. T. Cruz , and J. C.-W. Lin , “Prediction of speech quality based on resilient backpropagation artificial neural network,” Wireless Personal Communications , Vol. 96, no. 4, pp. 5375–89, Oct. 2017. Available: https://doi.org/10.1007/s11277-016-3746-2
- A. N. Kolmogoroff , “Sur la notion de la moyenne,” Acad. Naz. Lincei Mem. Cl. Sci. Fis. Mat. Natur. Sez. , Vol. 12, no. 6, pp. 388–91, 1930.
- M. Nagumo , “Über eine klasse der mittelwerte,” Jpn. J. Math. , Vol. 7, pp. 71–9, 1930.
- W. R. Hamilton , “On a new species of imaginary quantities connected with a theory of quaternions,” in Proc. R. Irish Academy , Vol. 2, no. 1843, pp. 424–34, Nov. 1844.
- B. C. Ujang , C. C. Took , and D. P. Mandic , “Split quaternion nonlinear adaptive filtering,” Neural Netw ., Vol. 23, no. 3, pp. 426–34, Apr. 2010.
- T. Nitta , “An extension of the back-propagation algorithm to complex numbers,” Neural Netw ., Vol. 10, no. 8, pp. 1391–415, Nov. 1997.
- B. K. Tripathi . High Dimensional Neurocomputing: Growth, Appraisal and Applications . New Delhi: Springer, 2015.
- W. S. McCulloch and W. Pitts , “A logical calculus of the ideas immanent in nervous activity,” Bull. Math. Biophys. , Vol. 4, no. 4, pp. 115–33, Dec. 1943.
- A. Hirose . Complex-Valued Neural Networks: Theories and Applications . Vol. 5., Singapore: World Scientific, 2003.
- T. Nitta , “A quaternary version of the back-propagation algorithm,” Proc. Int. Conf. Neural Netw., Vol. 5, Nov. 1995, pp. 2753–6.
- M. Schmitt , “On the complexity of computing and learning with multiplicative neural networks,” Neural Comput ., Vol. 14, no. 2, pp. 241–301, Feb. 2002.
- P. K. Kalra , B. Chandra , and M. Shiblee , “New neuron model for blind source separation,” in Proc. Int. Conf. Neural Inf. Process., Auckland , Nov. 2008, pp. 27–36.
- G. M. Georgiou , “Exact interpolation and learning in quadratic neuralnetworks,” in Proc. Int. Joint Conf. Neural Netw., Vancouver , Jul. 2006, pp. 230–4.
- S. J. Sangwine and N. L. Bihan , “Quaternion polar representation with a complex modulus and complex argument inspired by the Cayley-Dickson form,” Adv. Appl. Clifford Al. , Vol. 20, no. 1, pp. 111–20, Mar. 2010.
- E. Cho , “De moivre's formula for quaternions,” Appl. Math. Lett. ,Vol. 11, no. 6, pp. 33–5, Nov. 1998.
- D. B. Foggel , “An information criterion for optimal neural network selection,” IEEE Trans. Neural Netw. , Vol. 2, no. 5, pp. 490–7, Sep.1991.
- R. Naresh , S. Pandey , and J. B. Shukla , “Modeling the cumulative effect of ecological factors in the habitat on the spread of tuberculosis,” Int. J. Biomath. , Vol. 2, no. 3, pp. 339–55, Sep. 2009.