A maximum likelihood and regenerative bootstrap approach for estimation and forecasting of INAR( p ) processes with zero-inflated innovations
From MaRDI portal
Publication:6497070
DOI10.1080/02331888.2024.2344670MaRDI QIDQ6497070
Patrice Bertail, Unnamed Author, Francyelle L. Medina, Aldo M. Garay
Publication date: 6 May 2024
Published in: Statistics (Search for Journal in Brave)
Cites Work
- Unnamed Item
- Unnamed Item
- Unnamed Item
- Unnamed Item
- Unnamed Item
- Bootstrapping INAR models
- General mixed Poisson regression models with varying dispersion
- Log-linear Poisson autoregression
- On weak dependence conditions: the case of discrete valued processes
- Regenerative block-bootstrap for Markov chains
- On estimation and influence diagnostics for zero-inflated negative binomial regression models
- Note on integer-valued bilinear time series models
- A non-stationary integer-valued autoregressive model
- On the number of bootstrap simulations required to construct a confidence interval
- On the central limit theorem for stationary mixing random fields
- On the first-order Edgeworth expansion for a Markov chain
- Estimating the dimension of a model
- Edgeworth expansions of suitably normalized sample mean statistics for atomic Markov chains
- Mixing properties of non-stationary INGARCH(1, 1) processes
- Rademacher complexity for Markov chains: applications to kernel smoothing and Metropolis-Hastings
- Finite mixture of regression models for censored data based on scale mixtures of normal distributions
- Introduction to empirical processes and semiparametric inference
- Efficient Estimation of Auto-Regression Parameters and Innovation Distributions for Semiparametric Integer-Valued AR(p) Models
- A Score Test for Testing a Zero‐Inflated Poisson Regression Model Against Zero‐Inflated Negative Binomial Alternatives
- THE INTEGER-VALUED AUTOREGRESSIVE (INAR(p)) MODEL
- Zero‐Modified Geometric INAR(1) Process for Modelling Count Time Series with Deflation or Inflation of Zeros
- The EM Algorithm and Extensions, 2E
- Maximum likelihood estimation of higher-order integer-valued autoregressive processes
- Markov Chains and Stochastic Stability
- An Introduction to Discrete‐Valued Time Series
- Zero‐Inflated Poisson and Binomial Regression with Random Effects: A Case Study
- FIRST-ORDER INTEGER-VALUED AUTOREGRESSIVE (INAR(1)) PROCESS
- Modelling and coherent forecasting of zero-inflated count time series
- Bayesian analysis of the p-order integer-valued AR process with zero-inflated Poisson innovations
- Zero-Inflated NGINAR(1) process
- Bootstrapping Robust Statistics for Markovian Data Applications to Regenerative R‐Statistics and L‐Statistics
- First‐order integer valued AR processes with zero inflated poisson innovations
- MCMC for Integer-Valued ARMA processes
- A new look at the statistical model identification
This page was built for publication: A maximum likelihood and regenerative bootstrap approach for estimation and forecasting of INAR( p ) processes with zero-inflated innovations
