Dear Colleagues,

In the past, results related to fractional order operators have been reported both in theory and application, covering different fields such as modeling, identification, estimation, observer design, control, and signal processing, among others. The interest in using fractional order tools has increased rapidly over the last few decades, with solid results being obtained for the study of fractional order systems and signals for transient behavior, stability, convergence, and boundedness viewpoints, allowing a comparison of these techniques with those based on integer order derivative and integral operators, expanding the horizons on these topics.

The present Special Issue is devoted to new theories and applications, making use of fractional order operators and comparisons with their integer order counterparts. The topics of interest include, but are not limited to, the following areas:

• ­Fractional order control (adaptive and non-adaptive) theory and practice;
• ­Fractional order sliding mode control and applications;
• ­Stability of fractional order differential equations and systems;
• ­Fractional order observers and estimators;
• ­Back-stepping fractional order control (adaptive and non-adaptive systems);
• ­Fractional integrals and derivatives and their applications;
• ­Fractional order signal processing;
• ­Fractional order passivity and applications;
• ­Conformable fractional calculus;
• ­New definitions of fractional derivatives;
• ­Applications of fractional calculus
• ­Fractional order stochastic systems and controls;
• ­Fractional order modeling of physical systems.

Prof. Dr. Manuel Duarte-Mermoud
Prof. Dr. Rafael Castro-Linares
Guest Editors

Manuscript Submission Information

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• fractional order controllers
• fractional order observers
• stability of fractional order systems
• fractional order signal processing