Related references
Note: Only part of the references are listed.Local fractional similarity solution for the diffusion equation defined on Cantor sets
Xiao-Jun Yang et al.
APPLIED MATHEMATICS LETTERS (2015)
Fractional calculus for nanoscale flow and heat transfer
Hong-Yan Liu et al.
INTERNATIONAL JOURNAL OF NUMERICAL METHODS FOR HEAT & FLUID FLOW (2014)
Local Fractional Laplace Variational Iteration Method for Nonhomogeneous Heat Equations Arising in Fractal Heat Flow
Shu Xu et al.
MATHEMATICAL PROBLEMS IN ENGINEERING (2014)
A Review of Definitions for Fractional Derivatives and Integral
Edmundo Capelas de Oliveira et al.
MATHEMATICAL PROBLEMS IN ENGINEERING (2014)
INITIAL BOUNDARY VALUE PROBLEM FOR FRACTAL HEAT EQUATION IN THE SEMI-INFINITE REGION BY YANG-LAPLACE TRANSFORM
Yu-Zhu Zhang et al.
THERMAL SCIENCE (2014)
Local Fractional Adomian Decomposition and Function Decomposition Methods for Laplace Equation within Local Fractional Operators
Sheng-Ping Yan et al.
ADVANCES IN MATHEMATICAL PHYSICS (2014)
Cantor-type cylindrical-coordinate method for differential equations with local fractional derivatives
Xiao-Jun Yang et al.
PHYSICS LETTERS A (2013)
RECONSTRUCTIVE SCHEMES FOR VARIATIONAL ITERATION METHOD WITHIN YANG-LAPLACE TRANSFORM WITH APPLICATION TO FRACTAL HEAT CONDUCTION PROBLEM
Chun-Feng Liu et al.
THERMAL SCIENCE (2013)
FRACTAL HEAT CONDUCTION PROBLEM SOLVED BY LOCAL FRACTIONAL VARIATION ITERATION METHOD
Xiao-Jun Yang et al.
THERMAL SCIENCE (2013)
On the generalized Apostol-type Frobenius-Euler polynomials
Burak Kurt et al.
ADVANCES IN DIFFERENCE EQUATIONS (2013)