Fixed point analysis of hard impact-oscillators

Analytical closed form Poincare maps comprising higher-order transverse discontinuity mapping

Stability analysis - Analytical closed form Floquet and Lyapunov exponents

Vibro-impacts during vortex-induced vibrations

Numerical analysis of discontinuity-induced bifurcations

Stability analysis - Floquet and Lyapunov exponents incorporating higher-order transverse discontinuity mapping

Comparison between first-order and higher-order transverse discontinuity mapping and higher-order saltation matrix

Vibro-impacts during vortex-induced vibrations

Won first prize in the ALI H. NAYFEH BEST PAPER AWARD in NODYCON 2023, Italy

Normal form of a coupled and damaged Euler-Bernoulli Beam subjected to a quarter car bridge-vehicle interaction

Numerical analysis for various damage locations, crack-depth ratios and road surface roughness

Vibration control using tuned-mass dampers

Higher-order transverse discontinuity mapping of hard impact oscillators

Higher-order saltation matrix

Higher-order Floquet and Lyapunov exponents

Bridge-vehicle interaction

Instrumented trains as a sensor for damage detection

Structural health monitoring of damaged bridges

Ehrenfest's theorem to obtain dynamical equations for quantum systems

Bifurcation theory and fixed-point analysis of quantum systems

Fixed-point analysis from the trace and determinant properties of Jacobian matrices for quantum systems

Ehrenfest's theorem to obtain dynamical equations for the quantum Kapitza pendulum

Bifurcation theory and fixed-point analysis of quantum systems

Fixed-point analysis from the trace and determinant properties of Jacobian matrices for quantum systems

Ehrenfest's theorem to obtain dynamical equations for the quantum double-well potential

Bifurcation theory and fixed-point analysis of quantum systems

Fixed-point analysis from the trace and determinant properties of Jacobian matrices for quantum systems