This paper explores some novel solutions to the generalized Schrödinger-Boussinesq
(gSBq) equations, which describe the interaction between complex short wave and real long …

Nonlinear differential equations are widely used in everyday scientific and engineering
dynamics. Problems involving differential equations of fractional order with initial and phase …

The aim of this paper is to propose a new faster iterative scheme (called AA-iteration) to
approximate the fixed point of (b, η)-enriched contraction mapping in the framework of …

In this paper, we study a coupled fully hybrid system of (k, Φ)–Hilfer fractional differential
equations equipped with non-symmetric (k, Φ)–Riemann-Liouville (RL) integral conditions …

The oscillation of even‐order nonlinear differential equations (NLDiffEqs) with mixed
nonlinear neutral terms (MNLNTs) is investigated in this work. New oscillation criteria are …

Many techniques have been recently employed by researchers to address the challenges
posed by fractional differential equations. In this paper, we investigate the concept of Ulam …

This research inscription gets to grips with a specific kind of sequential hybrid fractional
differential equation en-capsuling a collective fractional derivative known as the ψ-Hilfer …

In this research work, a newly-proposed multiterm hybrid multi-order fractional boundary
value problem is studied. The existence results for the supposed hybrid fractional differential …

In this work, we use a bilinear approximation to examine the stability problem of a class of
control-affine systems. We show that a continuous feedback may stabilize the system with …

In this study, an efficient analytical method called the Sumudu Iterative Method (SIM) is
introduced to obtain the solutions for the nonlinear delay differential equation (NDDE). This …