The outbreak and rapid spread of COVID-19 has become a public health emergency of
international concern. A number of studies have used modeling techniques and developed …

After the spread of the SARS-CoV-2 epidemic out of China, evolution in the pandemic
worldwide shows dramatic differences among countries. In Europe, the situation of Italy first …

Background: Mathematical modeling of vector-borne diseases and forecasting of epidemics
outbreak are global challenges and big point of concern worldwide. The outbreaks depend …

We revisit well-established concepts of epidemiology, the Ising-model, and percolation
theory. Also, we employ a spin S= 1/2 Ising-like model and a (logistic) Fermi–Dirac-like …

In this paper, a general formulation for the SIRV epidemiological model is presented as a
system of fractional order derivatives with respect to time to characterize some infectious …

Cholera is a water and food borne infectious disease caused by the gram-negative
bacterium, Vibrio cholerae. Its dynamics are highly complex owing to the coupling among …

Mathematical modeling of epidemic spreading has been widely adopted to estimate the
threats of epidemic diseases (ie, the COVID-19 pandemic) as well as to evaluate epidemic …

In the recent COVID-19 pandemic, mathematical modeling constitutes an important tool to
evaluate the prospective effectiveness of non-pharmaceutical interventions (NPIs) and to …

The most important question and concern in these circumstances of COVID-19 epidemic
outspread is when will the pandemic end? Vaccination is the only solution to restore life to …

We deal in this paper with a diffusive SIR epidemic model described by reaction–diffusion
equations involving a fractional derivative. The existence and uniqueness of the solution are …