# Search results

Mathematical Methods in the Applied Sciences > 45 > 17 > 10775 - 10797

Boundary Value Problems > 2019 > 2019 > 1 > 1-12

*p*-Laplacian boundary value problem involving fractional conformable derivatives and nonlocal integral boundary conditions. Comparison theorems related to the proposed study are also proved. The paper concludes with an illustrative example for the main result.

Mathematical Methods in the Applied Sciences > 42 > 12 > 4394 - 4407

*p*‐Laplacian differential equation involving the right‐handed Riemann‐Liouville derivative. By applying monotone iterative technique, lower and upper solutions method and the Banach fixed point theorem, sufficient conditions for existence and uniqueness of extremal solutions are obtained and they...

Advances in Difference Equations > 2019 > 2019 > 1 > 1-18

*g*. This notion infers a new class of differential equations which has shown to have many applications. Herein we explore the use of such derivatives in the study of multivalued equations, the so-called

*g*-differential inclusions...

Journal of Fixed Point Theory and Applications > 2019 > 21 > 1 > 1-26

Journal of Mathematical Analysis and Applications > 2016 > 444 > 1 > 568-597

Journal of Mathematical Analysis and Applications > 2016 > 443 > 1 > 313-321

Advances in Difference Equations > 2016 > 2016 > 1 > 1-8

Advances in Difference Equations > 2016 > 2016 > 1 > 1-17

*p*-Laplacian differential equation involving Riemann-Liouville derivatives. Our results are obtained by constructing monotone iterative sequences of upper and lower solutions and applying the comparison result. At last, we present an example to illustrate the...

Discussiones Mathematicae, Differential Inclusions, Control and Optimization > 2016 > 36 > 2 > 155-179

Journal of Computational and Applied Mathematics > 2015 > 288 > C > 151-158

Journal of Mathematical Analysis and Applications > 2015 > 424 > 2 > 988-1005

Information Sciences > 2015 > 295 > Complete > 600-608

Journal of Mathematical Analysis and Applications > 2014 > 419 > 1 > 10-19

Applied Mathematics Letters > 2014 > 31 > Complete > 1-6

Annales Henri Poincaré > 2015 > 16 > 1 > 239-253

*U*in...

Mathematica Slovaca > 2014 > 64 > 2 > 379-390

*p*-Laplacian Dirichlet problems with strong nonlinearities. Under adequate assumptions we prove the smoothness of the extremal solutions for some classes of nonlinearities. Our results suggest that the extremal solution’s boundedness for some range of dimensions depends on the nonlinearity

*f*.

Nonlinear Analysis > 2013 > 92 > Complete > 138-152

Monatshefte für Mathematik > 2013 > 172 > 1 > 29-54

Journal of Mathematical Analysis and Applications > 2012 > 387 > 1 > 241-250