This paper introduces the concept of fractional-order complex Chebyshev filter
Transient and Steady-State Response of a Fractional-Order Dynamic PV Model under Different Loads
In this paper, a fractional-order dynamic model of the photovoltaic (PV) solar module is introduced
Generalized double-humped logistic map-based medical image encryption
This paper presents the design of the generalized Double Humped (DH) logistic map, used for pseudo-random number key generation (PRNG)
Review of fractional-order electrical characterization of supercapacitors
The tests and calculation of the key performance metrics of supercapacitors including capacitance, power and energy stored are commonly reported by the academia and the industry based on formulæ valid only for ideal capacitors
Experimental verification of triple lobes generation in fractional memristive circuits
Recently, the triple-lobe behavior is found in the I-V characteristics of some memristive devices generating another non-zero pinchoff point
Approximation of the fractional-order laplacian S? as a weighted sum of first-order high-pass filters
A new approximation method of the fractional-order Laplacian operator s? is introduced
Self-excited attractors in jerk systems: Overview and numerical investigation of chaos production
Chaos theory has attracted the interest of the scientific community because of its broad range of applications, such as in secure communications, cryptography or modeling multi-disciplinary phenomena
Chaotic properties of various types of hidden attractors in integer and fractional order domains
Nonlinear dynamical systems with chaotic attractors have many engineering applications such as dynamical models or pseudo-random number generators
Chaos and bifurcation in controllable jerk-based self-excited attractors
In the recent decades, utilization of chaotic systems has flourished in various engineering applications
Applications of continuous-time fractional order chaotic systems
The study of nonlinear systems and chaos is of great importance to science and engineering mainly because real systems are inherently nonlinear and linearization is only valid near the operating point