2017
DOI: 10.1177/1687814017742313
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Bifurcation and chaos for piecewise nonlinear roll system of rolling mill

Abstract: A non-smooth cold roll system of rolling mill is studied to reveal the bifurcation of the piecewise-smooth and discontinuous system. To examine the influence of the parameters on the dynamics, the bifurcation diagram is constructed when it is unperturbed. Hamilton phase diagrams of the non-smooth system are detected, which differ significantly from the ones obtained in the smooth system. Non-smooth homoclinic, heteroclinic, and periodic orbits are determined, which depend on the classical heteroclinic periodic… Show more

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Cited by 8 publications
(6 citation statements)
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“…In particular, we find that the results in [22,23] fits well with our situation, where the manifold separating the regions of smoothness is just a vertical line which is transversal to the homoclinic orbit (see Figure 4). A similar geometric configuration (for a different nonlinearity) has been also discussed in [25]. the vector field is not smooth.…”
Section: An Application Of the Melnikov Methodsmentioning
confidence: 89%
See 2 more Smart Citations
“…In particular, we find that the results in [22,23] fits well with our situation, where the manifold separating the regions of smoothness is just a vertical line which is transversal to the homoclinic orbit (see Figure 4). A similar geometric configuration (for a different nonlinearity) has been also discussed in [25]. the vector field is not smooth.…”
Section: An Application Of the Melnikov Methodsmentioning
confidence: 89%
“…Concerning the Melnikov method, in the recent years several interesting extensions have been achieved by different authors. The articles [13][14][15][16][17][18][19][20][21][22][23][24][25][26] and the references therein (just to mention a few main recent contributions in this area of research), show the great deal of interest in this topic both from the theoretical and the applied point of view. Most of the achieved results are general enough to cover the case of piecewise smooth differential systems which present a manifold of discontinuity.…”
Section: Introductionmentioning
confidence: 99%
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“…As shown in Figure 5, the rolling mill system, 2 a typical piecewise nonlinear problem, is considered. The governing equation can be written as follows: mtruex¨+ctruex˙+k1x+{k2x+k3x3,x0k4x+k5x3,x>0=Fcos(ωt). The equivalent form of Equation () can be expressed as follows: truerightcenterleftmx¨+cx˙+k1x+k2x+k3x3+(k4k2)projdouble-struckR0+(x)rightcenterleft+(k5k3)projdouble-struckR0+3(x)=Fcos(ωt).…”
Section: Numerical Examplesmentioning
confidence: 99%
“…Piecewise linear and nonlinear systems, such as gap‐activated springs in vibrating machines, 1,2 structures with damage or clearance, 3 gear backlashes, 4 and drag torques, 5 are commonly used in civil engineering, aerospace, mechanical engineering, and infrastructures. Because of the piecewise linear and nonlinear characteristics, these systems exhibit very complex and diverse dynamic behaviors.…”
Section: Introductionmentioning
confidence: 99%