The following pages link to Alex Elías-Zúñiga (Q280045):
Displaying 37 items.
- ``Quintication'' method to obtain approximate analytical solutions of non-linear oscillators (Q280046) (← links)
- Solution of the damped cubic-quintic Duffing oscillator by using Jacobi elliptic functions (Q295233) (← links)
- Approximate solutions of delay differential equations with constant and variable coefficients by the enhanced multistage homotopy perturbation method (Q304946) (← links)
- Exact solution of the cubic-quintic Duffing oscillator (Q346194) (← links)
- Application of the elliptic balance method to a nonlinear singular oscillator (Q387492) (← links)
- Exact solution of the quadratic mixed-parity Helmholtz-Duffing oscillator (Q433309) (← links)
- Equivalent representation form of oscillators with elastic and damping nonlinear terms (Q459847) (← links)
- Transient and steady-state responses of an asymmetric nonlinear oscillator (Q473842) (← links)
- Energy method to obtain approximate solutions of strongly nonlinear oscillators (Q473897) (← links)
- Equivalent mathematical representation of second-order damped driven nonlinear oscillators (Q473957) (← links)
- Accurate solutions of conservative nonlinear oscillators by the enhanced cubication method (Q474678) (← links)
- Constitutive equations for amended non-Gaussian network models of rubber elasticity (Q532797) (← links)
- Analysis of a beam-column system under varying axial forces of elliptic type: The exact solution of Lamé's equation (Q597808) (← links)
- On the solution of strong nonlinear oscillators by applying a rational elliptic balance method (Q611473) (← links)
- Analytical solution of the damped Helmholtz-Duffing equation (Q714596) (← links)
- Elliptic balance solution of two-degree-of-freedom, undamped, forced systems with cubic nonlinearity (Q842151) (← links)
- A nonlinear oscillatory system subjected to driving forces of elliptic type (Q842165) (← links)
- (Q1419446) (redirect page) (← links)
- Stress-softening effects in the transverse vibration of a non-Gaussian rubber string (Q1419447) (← links)
- A transformation method for solving conservative nonlinear two-degree-of-freedom systems (Q1717910) (← links)
- Enhanced multistage homotopy perturbation method: approximate solutions of nonlinear dynamic systems (Q1724230) (← links)
- Investigation of the equivalent representation form of strongly damped nonlinear oscillators by a nonlinear transformation approach (Q1789806) (← links)
- Approximate solution for the Duffing-harmonic oscillator by the enhanced cubication method (Q1954999) (← links)
- Fractal equation of motion of a non-Gaussian polymer chain: investigating its dynamic fractal response using an ancient Chinese algorithm. (Q2118787) (← links)
- A general solution of the Duffing equation (Q2458302) (← links)
- Application of Jacobian elliptic functions to the analysis of the steady-state solution of the damped Duffing equation with driving force of elliptic type (Q2499498) (← links)
- On The Elliptic Balance Method (Q4467277) (← links)
- Stress-Softening Effects in the Vibration of a Non-Gaussian Rubber Membrane (Q4467314) (← links)
- ANALYTICAL SOLUTION OF THE FRACTAL CUBIC–QUINTIC DUFFING EQUATION (Q5023952) (← links)
- EQUIVALENT POWER-FORM TRANSFORMATION FOR FRACTAL BRATU’S EQUATION (Q5024749) (← links)
- EQUIVALENT POWER-FORM REPRESENTATION OF THE FRACTAL TODA OSCILLATOR (Q5024763) (← links)
- INVESTIGATION OF THE STEADY-STATE SOLUTION OF THE FRACTAL FORCED DUFFING’S OSCILLATOR USING AN ANCIENT CHINESE ALGORITHM (Q5024983) (← links)
- AN EFFICIENT ANCIENT CHINESE ALGORITHM TO INVESTIGATE THE DYNAMICS RESPONSE OF A FRACTAL MICROGRAVITY FORCED OSCILLATOR (Q5024996) (← links)
- DYNAMICS RESPONSE OF THE FORCED FANGZHU FRACTAL DEVICE FOR WATER COLLECTION FROM AIR (Q5025325) (← links)
- DYNAMIC RESPONSE OF A FRACTAL CUSHIONING PACKAGING SYSTEM (Q5046662) (← links)
- ON TWO-SCALE DIMENSION AND ITS APPLICATION FOR DERIVING A NEW ANALYTICAL SOLUTION FOR THE FRACTAL DUFFING’S EQUATION (Q5864145) (← links)
- ANALYSIS OF A DAMPED FRACTAL SYSTEM USING THE ANCIENT CHINESE ALGORITHM AND THE TWO-SCALE FRACTAL DIMENSION TRANSFORM (Q5880686) (← links)