相关参考文献
注意:仅列出部分参考文献,下载原文获取全部文献信息。Analysis and applications of the proportional Caputo derivative
Ali Akgul et al.
ADVANCES IN DIFFERENCE EQUATIONS (2021)
ANALYSIS AND NEW APPLICATIONS OF FRACTAL FRACTIONAL DIFFERENTIAL EQUATIONS WITH POWER LAW KERNEL
Ali Akgul
DISCRETE AND CONTINUOUS DYNAMICAL SYSTEMS-SERIES S (2021)
A fractional order optimal 4D chaotic financial model with Mittag-Leffler law
A. Atangana et al.
CHINESE JOURNAL OF PHYSICS (2020)
Laplace Transform Method for Economic Models with Constant Proportional Caputo Derivative
Esra Karatas Akgul et al.
FRACTAL AND FRACTIONAL (2020)
A FRACTIONAL MODEL FOR THE DYNAMICS OF TUBERCULOSIS INFECTION USING CAPUTO-FABRIZIO DERIVATIVE
Saif Ullah et al.
DISCRETE AND CONTINUOUS DYNAMICAL SYSTEMS-SERIES S (2020)
A Theoretical Model of Listeriosis Driven by Cross Contamination of Ready-to-Eat Food Products
C. W. Chukwu et al.
INTERNATIONAL JOURNAL OF MATHEMATICS AND MATHEMATICAL SCIENCES (2020)
Optimal control of a discrete age-structured model for tuberculosis transmission
Fatmawati et al.
HELIYON (2020)
A mathematical model of tuberculosis (TB) transmission with children and adults groups: A fractional model
Fatmawati et al.
AIMS MATHEMATICS (2020)
Regularized Integral Representations of the Reciprocal Gamma Function
Dimiter Prodanov
FRACTAL AND FRACTIONAL (2019)
NEW NUMERICAL APPROACH FOR FRACTIONAL DIFFERENTIAL EQUATIONS
Abdon Atangana et al.
MATHEMATICAL MODELLING OF NATURAL PHENOMENA (2018)
A novel method for a fractional derivative with non-local and non-singular kernel
Ali Akgul
CHAOS SOLITONS & FRACTALS (2018)
A new fractional model for tuberculosis with relapse via Atangana-Baleanu derivative
Muhammad Altaf Khan et al.
CHAOS SOLITONS & FRACTALS (2018)
Chaos in a 5-D hyperchaotic system with four wings in the light of non-local and non-singular fractional derivatives
Ebenezer Bonyah
CHAOS SOLITONS & FRACTALS (2018)
New numerical approximation of fractional derivative with non-local and non-singular kernel: Application to chaotic models
Mekkaoui Toufik et al.
EUROPEAN PHYSICAL JOURNAL PLUS (2017)
Population dynamics of a mathematical model for syphilis
E. Iboi et al.
APPLIED MATHEMATICAL MODELLING (2016)
Chaos in a simple nonlinear system with Atangana-Baleanu derivatives with fractional order
Abdon Atangana et al.
CHAOS SOLITONS & FRACTALS (2016)
NEW FRACTIONAL DERIVATIVES WITH NON-LOCAL AND NON-SINGULAR KERNEL Theory and Application to Heat Transfer Model
Abdon Atangana et al.
THERMAL SCIENCE (2016)
Syphilis Cycles
David Aadland et al.
B E JOURNAL OF ECONOMIC ANALYSIS & POLICY (2013)
A New Mathematical Model of Syphilis
F. A. Milner et al.
MATHEMATICAL MODELLING OF NATURAL PHENOMENA (2010)
Generalized Taylor's formula
Zaid M. Odibat et al.
APPLIED MATHEMATICS AND COMPUTATION (2007)
Syphilis in China: results of a national surveillance programme
Zhi-Qiang Chen et al.
LANCET (2007)
Relapse of secondary syphilis after benzathine penicillin G - Molecular analysis
M Myint et al.
SEXUALLY TRANSMITTED DISEASES (2004)
Impact of mass treatment on syphilis transmission - A mathematical modeling approach
B Pourbohloul et al.
SEXUALLY TRANSMITTED DISEASES (2003)
Reproduction numbers and sub-threshold endemic equilibria for compartmental models of disease transmission
P van den Driessche et al.
MATHEMATICAL BIOSCIENCES (2002)
Syphilis: old problem, new strategy
L Doherty et al.
BMJ-BRITISH MEDICAL JOURNAL (2002)