Analytical Solutions of Excited Vibrations of a Beam with Application of Distribution

Kozień, Marek S.

doi:10.12693/aphyspola.123.1029

Cited by 15 publications

(7 citation statements)

References 6 publications

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“…Vibration is considered due to the moments produced by the advancement of the cutting tool, depending on the speed and depth of cut. The mathematical model is based on the formulation set forth by Kozien [37] and it is shown in Equations (13) and (14).…”

Section: Figure 2 Polishing Toolmentioning

confidence: 99%

Selective polishing method to increase precision in large format lightweight machine tools working with petrous material

Arango

Copete-Murillo

2019

Rev.Fac.Ing.Univ.Antioquia

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In this article two complementary methods are developed. Firstly, a method to add precision in large machine tools with modular lightweight structures (APLM), which performs the compensation of geometrics and dynamics errors using embedded intelligence, and secondly, an alternative polishing method called selective polishing (SP). This systematic process comprehends measurement tools and algorithm resources. Phenomena occurred in the machine structure, due to interaction between the cutting tools and the petrous materials in the grinding and polishing processes are modeled mathematically. Using validated flatness models, the variables and parameters were discretized to determine the errors with respect to the Z axis. To validate the method, a test machine of 3m 2 workspace with a multi-body lightweight structure design was built. The geometrical errors were determined using precision instruments and those were compared with a pattern surface. A higher flatness is achieved through a combined grinding-traditional polishing and selective polishing process using the same machine. This method saves time and energy consumption.

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Section: Figure 2 Polishing Toolmentioning

confidence: 99%

Selective polishing method to increase precision in large format lightweight machine tools working with petrous material

Arango

Copete-Murillo

2019

Rev.Fac.Ing.Univ.Antioquia

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“…the point of an action of the i-th concentrated force, q(x, t) is the distributed force, and δ(x) is the Dirac delta distribution [21]. According to the Bernoulli-Euler theory, transversal displacements of the beam during bending vibrations produce the so-called bending moment M g (x, t).…”

Section: A-57mentioning

confidence: 99%

Simulation of Control Algorithm for Active Reduction of Transversal Vibrations of Beams by Piezoelectric Elements Based on Identification of Bending Moment

Kozień

Ścisło

2015

Acta Phys. Pol. A

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Application of piezoelectric elements to active reduction of bending vibrations of the beams is known well in the literature. During vibrations, an external excitation may vary in the time domain, including its form in the frequency domain. It should have influence on their response. The problem of proper selection of the control parameter in the control algorithm used to reduce vibrations arises. In the article, simulations of a control algorithm based on detection of bending moment are analytically tested. The solution for the transient type of vibrations are obtained by the finite difference method (FDM). Analysis for two separated natural modes was performed. The analysis shows the possibility to design a control algorithm based on detection of the bending moment.

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“…A detailed solution for the general case of excited vibrations, especially in the transient case, are not easily found in the literature. This formulation was given by one of the authors of this paper for bending vibrations of a beam for different types of external excitations (Kozień, 2013).…”

Section: Introductionmentioning

confidence: 99%

Analytical solution of excited torsional vibrations of prismatic thin-walled beams

Augustyn

Kozień

2015

jtam

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In the paper, the analytical solution of excited torsional vibrations of prismatic thin-walled beams for different types of boundary conditions and different types of external excitation of torsional moment are formulated. The presented solution can be applied, among others, to preliminary analysis of the optimal position of the actuators and the value of the applied voltage to the elements for minimization of the vibrations of the beams.

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Analytical Solutions of Excited Vibrations of a Beam with Application of Distribution

Cited by 15 publications

References 6 publications

Selective polishing method to increase precision in large format lightweight machine tools working with petrous material

Selective polishing method to increase precision in large format lightweight machine tools working with petrous material

Simulation of Control Algorithm for Active Reduction of Transversal Vibrations of Beams by Piezoelectric Elements Based on Identification of Bending Moment

Analytical solution of excited torsional vibrations of prismatic thin-walled beams

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