Z-Transforms and its Inference on Partially Observable Point Processes

This paper proposes an inference framework based on the Z−transform for a specific class of nonhomogeneous point processes. This framework gives an alternative method to maximum likelihood estimation which is omnipresent in the field of point processes. The inference strategy is to couple or match the theoretical Z−transform with its empirical counterpart from the observed samples. This procedure fully characterizes the distribution of the point process since there exists a one-to-one mapping with theZ−transform. We illustrate how to use the methodology to estimate a point process whose intensity is driven by a general neural network.

[1]  Huawei Shen,et al.  Marked Temporal Dynamics Modeling Based on Recurrent Neural Network , 2017, PAKDD.

[2]  Michael J. Watts,et al.  IEEE TRANSACTIONS ON NEURAL NETWORKS AND LEARNING SYSTEMS Publication Information , 2020, IEEE Transactions on Neural Networks and Learning Systems.

[3]  Christopher R. Taber,et al.  Generalized Method of Moments , 2020, Time Series Analysis.

[4]  Masashi Sugiyama,et al.  Bayesian Nonparametric Poisson Process Allocation , 2017 .

[6]  Emery N. Brown,et al.  A Granger Causality Measure for Point Process Models of Ensemble Neural Spiking Activity , 2011, PLoS Comput. Biol..

[7]  Michael I. Jordan,et al.  Advances in Neural Information Processing Systems 30 , 1995 .

[8]  Stephen Haunts,et al.  What Are Data Breaches? , 2019, Applied Cryptography in .NET and Azure Key Vault.

[9]  Utkarsh Upadhyay,et al.  Recurrent Marked Temporal Point Processes: Embedding Event History to Vector , 2016, KDD.

[10]  Jason Eisner,et al.  The Neural Hawkes Process: A Neurally Self-Modulating Multivariate Point Process , 2016, NIPS.

[11]  Aditya Krishna Menon,et al.  Predicting Short-Term Public Transport Demand via Inhomogeneous Poisson Processes , 2017, CIKM.

[12]  Riadh Zaatour,et al.  Hawkes Process: Fast Calibration, Application to Trade Clustering and Diffusive Limit , 2013, Journal of Futures Markets.

[13]  Yacine Ait-Sahalia,et al.  Modeling Financial Contagion Using Mutually Exciting Jump Processes , 2010 .

[14]  Hongyuan Zha,et al.  Modeling the Intensity Function of Point Process Via Recurrent Neural Networks , 2017, AAAI.

[15]  Anima Anandkumar,et al.  A Method of Moments for Mixture Models and Hidden Markov Models , 2012, COLT.

[16]  G. Gurtner,et al.  Statistics in medicine. , 2011, Plastic and reconstructive surgery.

[17]  Yosihiko Ogata,et al.  On Lewis' simulation method for point processes , 1981, IEEE Trans. Inf. Theory.

[18]  Jun Yu Empirical Characteristic Function Estimation and Its Applications , 2003 .

[19]  Yiannis Demiris,et al.  Spatio-Temporal Learning With the Online Finite and Infinite Echo-State Gaussian Processes , 2015, IEEE Transactions on Neural Networks and Learning Systems.

[20]  J. Pitman Some Probabilistic Aspects of Set Partitions , 1997 .

[21]  Robert W. Heath,et al.  Modeling heterogeneous network interference , 2012, 2012 Information Theory and Applications Workshop.

[22]  Daniel J. Velleman American Mathematical Monthly , 2010 .

[23]  Walter F. Stewart,et al.  Doctor AI: Predicting Clinical Events via Recurrent Neural Networks , 2015, MLHC.

[24]  David C. Parkes,et al.  Generalized Method-of-Moments for Rank Aggregation , 2013, NIPS.

[25]  O. Kallenberg Foundations of Modern Probability , 2021, Probability Theory and Stochastic Modelling.

[26]  Emmanuel Bacry,et al.  Uncovering Causality from Multivariate Hawkes Integrated Cumulants , 2016, ICML.

[27]  Le Song,et al.  Time-Sensitive Recommendation From Recurrent User Activities , 2015, NIPS.

[28]  P. Brémaud Point processes and queues, martingale dynamics , 1983 .

[29]  Tonglin Zhang,et al.  Spatial scan statistics with overdispersion. , 2012, Statistics in medicine.

[30]  Scott W. Linderman,et al.  Discovering Latent Network Structure in Point Process Data , 2014, ICML.

[31]  David Vere-Jones,et al.  Point Processes , 2011, International Encyclopedia of Statistical Science.

[32]  Peter J. Diggle,et al.  Spatial and spatio-temporal Log-Gaussian Cox processes:extending the geostatistical paradigm , 2013, 1312.6536.

[33]  Yee Whye Teh,et al.  Poisson intensity estimation with reproducing kernels , 2016, AISTATS.