Approximate analytical mean-square response of an impacting stochastic system oscillator with fractional damping
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Antonina Pirrotta | M. Di Paola | Giuseppe Failla | Daniil Yurchenko | Andrea Burlon | A. Pirrotta | G. Failla | A. Burlon | D. Yurchenko | M. Paola
[1] R. Bagley,et al. On the Fractional Calculus Model of Viscoelastic Behavior , 1986 .
[3] R. Ibrahim,et al. Vibro-Impact Dynamics of Ocean Systems and Related Problems , 2009 .
[4] Antonina Pirrotta,et al. Innovative modeling of Tuned Liquid Column Damper motion , 2015, Commun. Nonlinear Sci. Numer. Simul..
[5] Marian Wiercigroch,et al. Modelling of high frequency vibro-impact drilling , 2015 .
[6] Antonina Pirrotta,et al. Fractional Visco-Elastic Euler-Bernoulli Beam , 2013 .
[7] D. V. Iourtchenko,et al. Numerical investigation of a response probability density function of stochastic vibroimpact systems with inelastic impacts , 2006 .
[8] A. Pirrotta,et al. Visco-elastic behavior through fractional calculus: An easier method for best fitting experimental results , 2011 .
[9] Antonina Pirrotta,et al. On the stochastic response of a fractionally-damped Duffing oscillator , 2012 .
[10] R. Gorenflo,et al. Time-fractional derivatives in relaxation processes: a tutorial survey , 2008, 0801.4914.
[11] A. Pirrotta,et al. Fractional Tajimi–Kanai model for simulating earthquake ground motion , 2014, Bulletin of Earthquake Engineering.
[12] Sondipon Adhikari,et al. A piezoelectric device for impact energy harvesting , 2011 .
[13] D. V. Iourtchenko,et al. Random Vibrations with Impacts: A Review , 2004 .
[14] R. Hilfer. Applications Of Fractional Calculus In Physics , 2000 .
[15] A. Gemant,et al. A Method of Analyzing Experimental Results Obtained from Elasto‐Viscous Bodies , 1936 .
[16] Antonina Pirrotta,et al. Fractional visco-elastic Timoshenko beam from elastic Euler–Bernoulli beam , 2015 .
[17] Peter J. Torvik,et al. Fractional calculus-a di erent approach to the analysis of viscoelastically damped structures , 1983 .
[18] Y. Rossikhin,et al. Stress waves in a viscoelastic medium with a singular hereditary kernel , 1973 .
[19] Helmut Schiessel,et al. Hierarchical analogues to fractional relaxation equations , 1993 .
[20] Pol D. Spanos,et al. Response of a non-linear system with restoring forces governed by fractional derivatives—Time domain simulation and statistical linearization solution , 2010 .
[21] Antonina Pirrotta,et al. Fractional visco‐elastic Timoshenko beam deflection via single equation , 2015 .
[22] Zheng Lu,et al. Studies of the performance of particle dampers attached to a two-degrees-of-freedom system under random excitation , 2011 .
[23] Michael Stiassnie,et al. On the application of fractional calculus for the formulation of viscoelastic models , 1979 .
[24] Lothar Gaul,et al. Finite Element Formulation of Viscoelastic Constitutive Equations Using Fractional Time Derivatives , 2002 .
[25] D. V. Iourtchenko,et al. Subharmonic Response of a Quasi-Isochronous Vibroimpact System to a Randomly Disordered Periodic Excitation , 1998 .
[26] S. F. Masri. EFFECTIVENESS OF TWO‐PARTICLE IMPACT DAMPERS , 1967 .
[27] Antonina Pirrotta,et al. Stationary and non-stationary stochastic response of linear fractional viscoelastic systems , 2012 .
[28] Antonina Pirrotta,et al. Dynamic Finite Element analysis of fractionally damped structural systems in the time domain , 2015 .
[29] Xiaoling Jin,et al. Response and stability of a SDOF strongly nonlinear stochastic system with light damping modeled by a fractional derivative , 2009 .
[30] Antonina Pirrotta,et al. Stochastic Response Of Fractionally Damped Beams , 2014 .
[31] R. Bagley,et al. A Theoretical Basis for the Application of Fractional Calculus to Viscoelasticity , 1983 .
[32] Wei Zhang,et al. Experimental study of a multi-impact energy harvester under low frequency excitations , 2014 .
[33] Raouf A. Ibrahim,et al. Vibro-Impact Dynamics , 2009 .
[34] D. V. Iourtchenko,et al. Towards incorporating impact losses into random vibration analyses : a model problem , 1999 .