Journal of Function Spaces

Recent Development on Nonlinear Methods in Function Spaces and Applications in Nonlinear Fractional Differential Equations


Status
Published

Lead Editor

1Curtin University of Technology, Perth, Australia

2Qufu Normal University, Qufu, China

3Shandong University of Finance and Economics, Jinan, China


Recent Development on Nonlinear Methods in Function Spaces and Applications in Nonlinear Fractional Differential Equations

Description

Nonlinear fractional differential equations arise from scientific research, modeling of nonlinear phenomena, and optimal control of complex systems. Function space theory has played an important role in the study of real world nonlinear fractional differential equations and the development of new technologies. Key research areas in this field include well-posedness of fractional mathematical models, development on nonlinear methods in function space, approximation theories and operator theory in function space, numerical computational methods, and control for nonlinear fractional differential equations.

We invite researchers to submit original research articles as well as review articles on various aspects of function space theories and their applications in nonlinear fractional differential equations to sciences, technologies, and engineering.

Potential topics include but are not limited to the following:

  • Nonlinear methods in function spaces
  • Novel technique to fractional differential equations in function spaces
  • Operator theory to fractional differential equations in function spaces
  • Nonlocal fractional models in function spaces
  • Impulsive fractional differential and integral equations
  • Numerical analysis for nonlinear fractional differential equations
  • Analysis and control in fractional differential equations
  • Fractional partial differential equation in function spaces
  • Fractional evolution equations in function spaces

Articles

  • Special Issue
  • - Volume 2018
  • - Article ID 1678148
  • - Editorial

Recent Development on Nonlinear Methods in Function Spaces and Applications in Nonlinear Fractional Differential Equations

Xinguang Zhang | Yonghong Wu | ... | Hua Su
  • Special Issue
  • - Volume 2018
  • - Article ID 3152502
  • - Research Article

Approximating Solution of Fabrizio-Caputo Volterra’s Model for Population Growth in a Closed System by Homotopy Analysis Method

Tahereh Bashiri | S. Mansour Vaezpour | Juan J. Nieto
  • Special Issue
  • - Volume 2017
  • - Article ID 5306802
  • - Research Article

Weak and Strong Convergence Theorems for the Multiple-Set Split Equality Common Fixed-Point Problems of Demicontractive Mappings

Yaqin Wang | Tae-Hwa Kim | Xiaoli Fang
  • Special Issue
  • - Volume 2017
  • - Article ID 2095805
  • - Research Article

Periodicities of a System of Difference Equations

Weizhen Quan | Miaoqiao Pan | Xiaopei Li
  • Special Issue
  • - Volume 2017
  • - Article ID 8548975
  • - Research Article

Multiple Solutions for a Nonlinear Fractional Boundary Value Problem via Critical Point Theory

Yang Wang | Yansheng Liu | Yujun Cui
  • Special Issue
  • - Volume 2017
  • - Article ID 3187492
  • - Research Article

Positive Solutions of Fractional Differential Equations with -Laplacian

Yuansheng Tian | Sujing Sun | Zhanbing Bai
  • Special Issue
  • - Volume 2017
  • - Article ID 1982568
  • - Research Article

Rapid Convergence for Telegraph Systems with Periodic Boundary Conditions

Peiguang Wang | Xiang Liu
  • Special Issue
  • - Volume 2017
  • - Article ID 6521357
  • - Research Article

Exact Solutions of the Vakhnenko-Parkes Equation with Complex Method

Yongyi Gu | Wenjun Yuan | ... | Qinghua Jiang
  • Special Issue
  • - Volume 2017
  • - Article ID 2785937
  • - Research Article

The Existence of Solutions to Integral Boundary Value Problems of Fractional Differential Equations at Resonance

Yumei Zou | Guoping He
  • Special Issue
  • - Volume 2017
  • - Article ID 3679526
  • - Research Article

A Compact Difference Scheme for Solving Fractional Neutral Parabolic Differential Equation with Proportional Delay

Wei Gu | Yanli Zhou | Xiangyu Ge
Journal of Function Spaces
 Journal metrics
Acceptance rate28%
Submission to final decision43 days
Acceptance to publication37 days
CiteScore2.000
Impact Factor1.896
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