Ljiljana Veljović scite author profile

Ljiljana Veljović

5Publications

28Citation Statements Received

39Citation Statements Given

How they've been cited

How they cite others

105

Affiliations

University of Kragujevac

Publications

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Vector Rotators of Rigid Body Dynamics with Coupled Rotations around Axes without Intersection

Hedrih¹,

Veljović

2011

Mathematical Problems in Engineering

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Vector method based on mass moment vectors and vector rotators coupled for pole and oriented axes is used for obtaining vector expressions for kinetic pressures on the shaft bearings of a rigid body dynamics with coupled rotations around axes without intersection. Mass inertia moment vectors and corresponding deviational vector components for pole and oriented axis are defined by K. Hedrih in 1991. These kinematical vectors rotators are defined for a system with two degrees of freedom as well as for rheonomic system with two degrees of mobility and one degree of freedom and coupled rotations around two coupled axes without intersection as well as their angular velocities and intensity. As an example of defined dynamics, we take into consideration a heavy gyrorotor disk with one degree of freedom and coupled rotations when one component of rotation is programmed by constant angular velocity. For this system with nonlinear dynamics, a series of tree parametric transformations of system nonlinear dynamics are presented. Some graphical visualization of vector rotators properties are presented too.

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Using high-order shear deformation theory in the analysis of Lamb’s waves propagation in materials reinforced with two families of fibers

et al. 2016

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Wave propagation in layer with two preferred directions

Milosavljević

Bogdanović

Veljović

et al. 2015

International Journal of Non-Linear Mechanics

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Nonlinear dynamics of the heavy gyro-rotor with two skew rotating axes

Hedrih¹,

Veljović²

2008

J. Phys.: Conf. Ser.

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A New Model of the Fractional Order Dynamics of the Planetary Gears

Nikolić-Stanojević

Veljović

Dolićanin

2013

Mathematical Problems in Engineering

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A theoretical model of planetary gears dynamics is presented. Planetary gears are parametrically excited by the time-varying mesh stiffness that fluctuates as the number of gear tooth pairs in contact changes during gear rotation. In the paper, it has been indicated that even the small disturbance in design realizations of this gear cause nonlinear properties of dynamics which are the source of vibrations and noise in the gear transmission. Dynamic model of the planetary gears with four degrees of freedom is used. Applying the basic principles of analytical mechanics and taking the initial and boundary conditions into consideration, it is possible to obtain the system of equations representing physical meshing process between the two or more gears. This investigation was focused to a new model of the fractional order dynamics of the planetary gear. For this model analytical expressions for the corresponding fractional order modes like one frequency eigen vibrational modes are obtained. For one planetary gear, eigen fractional modes are obtained, and a visualization is presented. By using MathCAD the solution is obtained.

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