Cancer, one of the most dangerous diseases with a high mortality rate, has attracted much
attention and interest. Advances in tissue engineering and microfluidics have led to the …

The study of optical soliton solutions plays a vital role in nonlinear optics. The foremost area
of optical solitons research encompasses around optical fiber, telecommunication, meta …

Fractal-fractional derivatives, which are still rather new, are frequently used to look into the
complexities of an issue. Today, tumors are a prevalent and difficult-to-treat condition. The …

This research considers an inverse source problem for fractional diffusion equation that
containing fractional derivative with non-singular and non-local kernel, namely, Atangana …

One of the most interesting branches of fractional calculus is the local fractional calculus,
which has been used successfully to describe many fractal problems in science and …

Mathematical modeling of uncertain fractional integrodifferentials (FIDEs) is an extremely
significant topic in electric circuits, signal processing, electromagnetics, and anomalous …

In this paper, we present a mathematical model of brain tumor. This model is an extension of
a simple two-dimensional mathematical model of glioma growth and diffusion which is …

In this paper, it has been discussed the fractional model of Brinkman type fluid (BTF) holding
hybrid nanoparticles. Titanium dioxide (T i O 2) and silver (Ag) nanoparticles were liquefied …

The applications of the diffusion wave model of a time-fractional kind with dam** and
reaction terms can occur within classical physics. This quantification of the activity can …

The spread of COVID-19 to more than 200 countries has shocked the public. Therefore,
understanding the dynamics of transmission is very important. In this paper, the COVID-19 …