Parametric Reduced Order Models for Bladed Disks With Mistuning and Varying Operational Speed

A considerable amount of research has been conducted to develop reduced order models (ROMs) of bladed disks that can be constructed using single sector calculations when there is mistuning present. A variety of methods have been developed to efficiently handle different types of mistuning ranging from small frequency mistuning, which can be modeled using a variety of methods including component mode mistuning (CMM), to large geometric mistuning, which can be modeled using multiple techniques including pristine rogue interface modal expansion (PRIME). Research has also been conducted on developing ROMs that can accommodate the variation of specific parameters in the reduced space; these models are referred to as parametric reduced order models (PROMs). This work introduces a PROM for bladed disks that allows for the variation of rotational speed in the reduced space. These PROMs are created by extracting information from sector models at three rotational speeds, and then the appropriate ROM is efficiently constructed in the reduced space at any other desired speed. This work integrates these new PROMs for bladed disks with two existing mistuning methods, CMM and PRIME, to illustrate how the method can be readily applied for a variety of mistuning methods. Frequencies and forced response calculations using these new PROMs are compared to the full order finite element calculations to demonstrate the effectiveness of the method.

[1]  A. Srinivasan,et al.  Influence of Mistuning on Rotor-Blade Vibrations , 1975 .

[2]  Romuald Rzadkowski,et al.  Multistage Coupling of Eight Mistuned Bladed Disk on a Solid Shaft: Part 1—Free Vibration Analysis , 2012 .

[3]  J. H. Griffin,et al.  Model Development and Statistical Investigation of Turbine Blade Mistuning , 1984 .

[4]  Christophe Pierre,et al.  Component-Mode-Based Reduced Order Modeling Techniques for Mistuned Bladed Disks—Part II: Application , 2001 .

[5]  Tianyi Hu,et al.  Generalized BAA and X-Xr for Modeling Cyclically Symmetric Structures With Cracks , 2018 .

[6]  Jerry H. Griffin,et al.  A Reduced-Order Model of Mistuning Using a Subset of Nominal System Modes , 2001 .

[7]  Akira Saito,et al.  Reduced-Order Modeling for Nonlinear Analysis of Cracked Mistuned Multistage Bladed-Disk Systems , 2012 .

[8]  Bogdan I. Epureanu,et al.  A Mode-Accelerated XXr (MAX) method for complex structures with large blends , 2017 .

[9]  Denis Laxalde,et al.  Dynamics of Multistage Bladed Disks Systems , 2007 .

[10]  Bogdan I. Epureanu,et al.  A Statistical Characterization of the Effects of Mistuning in Multi-Stage Bladed Disks , 2011 .

[11]  Bogdan I. Epureanu,et al.  Reduced-order modeling approach for blisks with large mass, stiffness, and geometric mistuning , 2012 .

[12]  Christophe Pierre,et al.  System Identification of Multistage Turbine Engine Rotors , 2007 .

[13]  Seunghun Baek,et al.  Reduced-Order Models for Blisks With Small and Large Mistuning and Friction Dampers , 2016 .

[14]  Sang Heon Song Vibration analysis and system identification of mistuned multistage turbine engine rotors. , 2007 .

[15]  Bogdan I. Epureanu,et al.  Analyzing mistuned multi-stage turbomachinery rotors with aerodynamic effects , 2013 .

[16]  J. H. Griffin,et al.  A Fundamental Model of Mistuning for a Single Family of Modes , 2002 .

[17]  Bogdan I. Epureanu,et al.  Nonlinear amplitude approximation for bilinear systems , 2014 .

[18]  P. Casini,et al.  Non-linear dynamics of a cracked cantilever beam under harmonic excitation , 2007 .

[19]  Arnaud Sternchüss,et al.  Reduction of Multistage Disk Models: Application to an Industrial Rotor , 2008 .

[20]  David Gorsich,et al.  Parametric reduced-order models for predicting the vibration response of complex structures with component damage and uncertainties , 2011 .

[21]  Marcin Drewczynski,et al.  Multistage Coupling of Eight Bladed Discs on a Solid Shaft , 2010 .

[22]  V. Ramamurti,et al.  A parametric study of vibration of rotating pre-twisted and tapered low aspect ratio cantilever plates , 1981 .

[23]  Arnaud Sternchüss Multi-level parametric reduced models of rotating bladed disk assemblies , 2009 .

[24]  Meng-Hsuan Tien,et al.  A generalized bilinear amplitude and frequency approximation for piecewise-linear nonlinear systems with gaps or prestress , 2017 .

[25]  Christophe Pierre,et al.  Component-Mode-Based Reduced Order Modeling Techniques for Mistuned Bladed Disks—Part I: Theoretical Models , 2001 .

[26]  Christophe Pierre,et al.  Compact, Generalized Component Mode Mistuning Representation for Modeling Bladed Disk Vibration , 2003 .

[27]  Eric Kurstak,et al.  Multistage Blisk and Large Mistuning Modeling Using Fourier Constraint Modes and PRIME , 2017 .

[28]  Bogdan I. Epureanu,et al.  A Statistical Characterization of the Effects of Mistuning in Multistage Bladed Disks , 2012 .