Pages that link to "Item:Q1196767"

The following pages link to A modified Lindstedt-Poincaré method for certain strongly non-linear oscillators (Q1196767):

Displaying 50 items.

• A method to stochastic dynamical systems with strong nonlinearity and fractional damping (Q335755) (← links)
• Closed-form criterion for convergence and stability of pseudo-force method for nonlinear dynamic analysis (Q345925) (← links)
• Construction of approximate analytical solutions to strongly nonlinear damped oscillators (Q363635) (← links)
• An analytical technique for solving a class of strongly nonlinear conservative systems (Q426594) (← links)
• On the application of the homotopy analysis method to limit cycles' approximation in planar self-excited systems (Q450493) (← links)
• Approximation of limit cycles in two-dimensional nonlinear systems near a Hopf bifurcation by canonical transformations (Q525185) (← links)
• Accurate approximation to the double sine-Gordon equation (Q538864) (← links)
• An analytical technique to find approximate solutions of nonlinear damped oscillatory systems (Q548438) (← links)
• An artificial parameter-Linstedt-Poincaré method for oscillators with smooth odd nonlinearities (Q602327) (← links)
• Primary resonance of multiple degree-of-freedom dynamic systems with strong non-linearity using the homotopy analysis method (Q605259) (← links)
• Accurate analytical solutions to oscillators with discontinuities and fractional-power restoring force by means of the optimal homotopy asymptotic method (Q614342) (← links)
• Application of a generalized senator-bapat perturbation technique to nonlinear dynamical systems with an irrational restoring force (Q623140) (← links)
• Asymptotic methods for vibrations of the pure non-integer order oscillator (Q623215) (← links)
• On the use of two classical series expansion methods to determine the vibration of harmonically excited pure cubic oscillators (Q637948) (← links)
• Study on asymptotic analytical solutions using HAM for strongly nonlinear vibrations of a restrained cantilever beam with an intermediate lumped mass (Q645033) (← links)
• On nonlinear oscillation response of a negatively dissipated oscillator and its analogy to long Josephson junction (Q715896) (← links)
• Parameter-splitting perturbation method for the improved solutions to strongly nonlinear systems (Q783614) (← links)
• Application of a modified Lindstedt-Poincaré method in coupled TDOF systems with quadratic nonlinearity and a constant external excitation (Q835422) (← links)
• Newton-harmonic balancing approach for accurate solutions to nonlinear cubic-quintic duffing oscillators (Q840119) (← links)
• A new perturbation procedure for limit cycle analysis in three-dimensional nonlinear autonomous dynamical systems (Q840308) (← links)
• Nonlinear vibration of a two-mass system with nonlinear stiffnesses (Q842159) (← links)
• Modified Lindstedt-Poincaré methods for some strongly nonlinear oscillations. I: Expansion of a constant (Q872769) (← links)
• Modified Lindstedt-Poincaré methods for some strongly nonlinear oscillations. II: A new transformation (Q872770) (← links)
• Modeling nonlinear oscillators: a new approach (Q873352) (← links)
• An analytical method for analyzing symmetry-breaking bifurcation and period-doubling bifurcation (Q907646) (← links)
• Study of a piecewise linear dynamic system with negative and positive stiffness (Q907672) (← links)
• Periodic solutions for some strongly nonlinear oscillations by He's variational iteration method (Q928828) (← links)
• Periodic solutions of Duffing equation with strong nonlinearity (Q929127) (← links)
• Homotopy-perturbation method for pure nonlinear differential equation (Q943322) (← links)
• Analysis of the nonlinear vibration of a two-mass-spring system with linear and nonlinear stiffness (Q974557) (← links)
• An analytical approach to the dynamic analysis of a rotating electric machine (Q979750) (← links)
• On Linstedt-Poincaré techniques for the quintic Duffing equation (Q990597) (← links)
• He's parameter-expanding methods for strongly nonlinear oscillators (Q997358) (← links)
• A perturbation method for certain nonlinear oscillators (Q1058321) (← links)
• Strongly resonant bifurcations of nonlinearly coupled van der Pol-Duffing oscillator (Q1305391) (← links)
• An elliptic Lindstedt-Poincaré method for certain strongly nonlinear oscillators (Q1362199) (← links)
• Linearized perturbation technique and its applications to strongly nonlinear oscillators. (Q1416368) (← links)
• A novel class of highly efficient and accurate time-integrators in nonlinear computational mechanics (Q1705164) (← links)
• Application of extended homotopy analysis method to the two-degree-of-freedom coupled van der Pol-Duffing oscillator (Q1724836) (← links)
• Modified Lindstedt-Poincaré method with multiple time scales for combination resonance of damped dynamical systems with strong non-linearities (Q1786221) (← links)
• Modified Legendre operational matrix of differentiation for solving strongly nonlinear dynamical systems (Q1794702) (← links)
• The spreading residue harmonic balance method for strongly nonlinear vibrations of a restrained cantilever beam (Q1798428) (← links)
• The MLP method for subharmonic and ultra-harmonic resonance solutions of strongly nonlinear systems (Q1841496) (← links)
• Forced pure nonlinear symmetrical oscillators (Q1933932) (← links)
• Analytical approximations to primary resonance response of harmonically forced oscillators with strongly general nonlinearity (Q2049829) (← links)
• Numerical simulation of van der Pol equation using multiple scales modified Lindstedt-Poincaré method (Q2052241) (← links)
• A new technique for solving a class of strongly nonlinear oscillatory equations (Q2169661) (← links)
• Computation of all the coefficients for the global connections in the \(\mathbb{Z}_2\)-symmetric Takens-Bogdanov normal forms (Q2206497) (← links)
• Determination of periodic solutions for nonlinear oscillators with fractional powers by He's modified Lindstedt-Poincaré method (Q2267974) (← links)
• Analytical approximation of cuspidal loops using a nonlinear time transformation method (Q2293948) (← links)