Theoretical investigation of the improved nonlinear dynamic model for star gearing system in GTF gearbox based on dynamic meshing parameters
Published 2020 View Full Article
- Home
- Publications
- Publication Search
- Publication Details
Title
Theoretical investigation of the improved nonlinear dynamic model for star gearing system in GTF gearbox based on dynamic meshing parameters
Authors
Keywords
GTF gearbox, Star gearing system, Time-varying meshing parameters, Dynamic backlash, Nonlinear dynamics
Journal
MECHANISM AND MACHINE THEORY
Volume 156, Issue -, Pages 104108
Publisher
Elsevier BV
Online
2020-10-08
DOI
10.1016/j.mechmachtheory.2020.104108
References
Ask authors/readers for more resources
Related references
Note: Only part of the references are listed.- Study on load sharing behavior of coupling gear-rotor-bearing system of GTF aero-engine based on multi-support of rotors
- (2020) Siyu Wang et al. MECHANISM AND MACHINE THEORY
- Investigation of nonlinear dynamics and load sharing characteristics of a two-path split torque transmission system
- (2020) Zehua Hu et al. MECHANISM AND MACHINE THEORY
- Dynamic model and load sharing performance of planetary gear system with journal bearing
- (2020) Chunpeng Zhang et al. MECHANISM AND MACHINE THEORY
- A phenomenological model for investigating unequal planet load sharing in epicyclic gearboxes
- (2019) Zongyao Liu et al. MECHANICAL SYSTEMS AND SIGNAL PROCESSING
- Nonlinear Dynamics of a Multistage Gear Transmission System with Multi-Clearance
- (2018) Ling Xiang et al. INTERNATIONAL JOURNAL OF BIFURCATION AND CHAOS
- Dynamic analysis of a planetary gear system with multiple nonlinear parameters
- (2018) Ling Xiang et al. JOURNAL OF COMPUTATIONAL AND APPLIED MATHEMATICS
- Design of a flexure-based constant-force XY precision positioning stage
- (2017) Piyu Wang et al. MECHANISM AND MACHINE THEORY
- Effects of the gear eccentricities on the dynamic performance of a planetary gear set
- (2017) Zheng Cao et al. NONLINEAR DYNAMICS
- Bifurcation and chaos analysis for multi-freedom gear-bearing system with time-varying stiffness
- (2016) Ling Xiang et al. APPLIED MATHEMATICAL MODELLING
- Tooth profile modification based on lateral- torsional-rocking coupled nonlinear dynamic model of gear system
- (2016) Hui Liu et al. MECHANISM AND MACHINE THEORY
- Nonlinear torsional vibrations of a wind turbine gearbox
- (2015) Mingming Zhao et al. APPLIED MATHEMATICAL MODELLING
- Research on gears’ dynamic performance influenced by gear backlash based on fractal theory
- (2014) Qi Chen et al. APPLIED SURFACE SCIENCE
- Nonlinear dynamics and stability of wind turbine planetary gear sets under gravity effects
- (2014) Yi Guo et al. EUROPEAN JOURNAL OF MECHANICS A-SOLIDS
- Bifurcation and chaos analysis of multistage planetary gear train
- (2013) Sheng Li et al. NONLINEAR DYNAMICS
- Three-dimensional nonlinear vibration of gear pairs
- (2012) Tugan Eritenel et al. JOURNAL OF SOUND AND VIBRATION
- Chaotic responses on gear pair system equipped with journal bearings under turbulent flow
- (2011) Cai-Wan Chang-Jian et al. APPLIED MATHEMATICAL MODELLING
- Dynamic analysis for a planetary gear with time-varying pressure angles and contact ratios
- (2011) Woohyung Kim et al. JOURNAL OF SOUND AND VIBRATION
- Dynamic modeling and analysis of a spur planetary gear involving tooth wedging and bearing clearance nonlinearity
- (2010) Yi Guo et al. EUROPEAN JOURNAL OF MECHANICS A-SOLIDS
- Dynamic analysis for a pair of spur gears with translational motion due to bearing deformation
- (2010) Woohyung Kim et al. JOURNAL OF SOUND AND VIBRATION
- Nonlinear couplings in a gear-shaft-bearing system
- (2010) S. Baguet et al. MECHANISM AND MACHINE THEORY
- Nonlinear dynamic characteristics of geared rotor bearing systems with dynamic backlash and friction
- (2010) Chen Siyu et al. MECHANISM AND MACHINE THEORY
Discover Peeref hubs
Discuss science. Find collaborators. Network.
Join a conversationAsk a Question. Answer a Question.
Quickly pose questions to the entire community. Debate answers and get clarity on the most important issues facing researchers.
Get Started