Faculty Profile

← Back to faculty directory
Mohammed Kafini

Mohammed Kafini

Lecturer-A

πŸ“ 5-504πŸ“ž 2603βœ‰οΈ mkafini@kfupm.edu.saπŸ”— Pure

Research Overview

Research interests include Hyperpolic Equations and systems and viscoelasticity and thermoelasticity.

Hyperpolic Equations and systems

viscoelasticity and thermoelasticity

Education

MS
Information not available
Default
PhD
Information not available
Default

Selected Publications

TitleJournalYear
GLOBAL NONEXISTENCE OF SOLUTIONS FOR A NONLINEAR EXTENSIBLE BEAM EQUATIONS IN A CLASS OF MODIFIED WOINOWSKY-KRIEGER MODELS WITH TIME DELAYJournal of Nonlinear Functional Analysis2026
On the Decay and Global Existence of Solutions to a Nonlinearly Damped Wave Equation with Variable Exponents and DelayJournal of Applied Nonlinear Dynamics2025
Long-time behaviour of a one-dimensional porous-elastic system with large amplitudeInternational Journal of Computer Mathematics2025
Different aspects of blow-up property for a nonlinear wave equationPartial Differential Equations in Applied Mathematics2024
Existence and Blow-up Study of a Quasilinear Wave Equation with Damping and Source Terms of Variable Exponents-type Acting on the BoundaryJournal of Dynamical and Control Systems2024
Blow-up study of a nonlinear hyperbolic system with delayPartial Differential Equations in Applied Mathematics2024
Well-posedness and exponential stability for the logarithmic LamΓ© system with a time delayApplicable Analysis2024
Existence and stability results of nonlinear swelling equations with logarithmic source termsAIMS Mathematics2024
Asymptotic Behavior of Solutions to a Nonlinear Swelling Soil System with Time Delay and Variable ExponentsMathematical and Computational Applications2023
General energy decay estimate for a viscoelastic damped swelling porous elastic soils with time delayMathematical Methods in the Applied Sciences2023
Existence and blow up time estimate for a nonlinear Cauchy problem with variable exponents: theory and numericsInternational Journal of Computer Mathematics2023
Delayed wave equation with logarithmic variable-exponent nonlinearityElectronic Research Archive2023
ON the BLOW-UP of the CAUCHY PROBLEM of HIGHER-ORDER NONLINEAR VISCOELASTIC WAVE EQUATIONDiscrete and Continuous Dynamical Systems - Series S2022
Well-posedness, theoretical and numerical stability results of a memory-type porous thermoelastic systemZeitschrift fur Angewandte Mathematik und Physik2022
Decay result in a problem of a nonlinearly damped wave equation with variable exponentAIMS Mathematics2022
A Stability Result for a Viscoelastic Wave Equation in the Presence of Finite and Infinite MemoriesJournal of Mathematics2022
On the decay of a nonlinear wave equation with delayAnnali dell'Universita di Ferrara2021
Local existence and lower bound of blow-up time to a cauchy problem of a coupled nonlinear wave equationsAIMS Mathematics2021
Global existence and new decay results of a viscoelastic wave equation with variable exponent and logarithmic nonlinearitiesAIMS Mathematics2021
On the global existence and asymptotic behavior of the solution of a nonlinear wave equation with past historyJournal of Mathematical Physics2021

Graduate Students

PhD Students

MS Students

Courses Taught

Office Hours (Term-251):

Sunday
10:00-11:00AM
Tuesday
10:00-11:00AM
Thursday
10:00-11:00AM
Remarks
Any other times, by an appointment, are welcomed.
Any other times, by an appointment, are welcomed.

Undergraduate

MATH 101Calculus IMATH 201Calculus III

Graduate

Graduate teaching information not available.