2005
DOI: 10.1088/0960-1317/15/9/003
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Extending the validity of squeezed-film damper models with elongations of surface dimensions

Abstract: Compact models for micromechanical squeezed-film dampers with gap sizes comparable to the surface dimensions are presented. Two different models considering both the border flow and non-uniform pressure distribution effects are first derived for small squeeze numbers. In the first 'surface extension' model the border effects are considered simply by calculating the damping with extended surface dimensions, and in the second 'border flow channel' model an additional short fictitious flow channel is placed at th… Show more

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Cited by 72 publications
(84 citation statements)
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“…The analysis models are obtained from Mukherjee et al (1999) and Zhou (1998), except for the mechanical spring stiffness analysis and some extensions to the damping coefficient model. The spring model is developed here from linear beam theory, and the damping model is extended to also account for the small aspect ratios in squeezed film damping using the models of Veijola et al (2005).…”
Section: Structuresmentioning
confidence: 99%
See 1 more Smart Citation
“…The analysis models are obtained from Mukherjee et al (1999) and Zhou (1998), except for the mechanical spring stiffness analysis and some extensions to the damping coefficient model. The spring model is developed here from linear beam theory, and the damping model is extended to also account for the small aspect ratios in squeezed film damping using the models of Veijola et al (2005).…”
Section: Structuresmentioning
confidence: 99%
“…Squeezed film damping between the rotor and stator comb fingers (2 times N f + N s gaps) can be approximated by a damping coefficient b s (Veijola et al 2005)…”
Section: Damping Coefficientmentioning
confidence: 99%
“…These equations are identical with the "narrow gap" equations specified in [6], but they include an additional equation (12). The strategy to have an approximate solution for the equations above is the following.…”
Section: F Reduced Equations For the Approximative Modelmentioning
confidence: 99%
“…Also, the pressure is no more constant across the gap even at small frequencies. These phenomena have been studied in [12] regime is between the squeeze-film and the gap resonance regions. Table II summarizes the resonant frequencies detected from the amplitude/phase responses of all simulated topologies.…”
Section: B Validity Of the Compact Modelmentioning
confidence: 99%
“…One is based on the modification of continuum theories. Examples in this category include, but are not limited to, the modification of Reynolds' equation by employing the effective viscosity obtained either from a linearized Bhatnagar-Gross-Krook solution of the Poiseuille flow 12,14,23 or from experimental data 24,25 via curve fitting, by using a pressure dependent effective flow rate coefficient 13 and a modified pressure boundary condition with coefficients extracted from the NavierStokes slip-jump simulations and the direct simulation Monte Carlo ͑MC͒ simulations. 15 Most of these methods have demonstrated their accuracy in the slip regime ͑Kn Յ 0.1͒, i.e., the near continuum regime.…”
Section: Introductionmentioning
confidence: 99%