연구동향 분석

MULTIPLE POSITIVE SOLUTIONS OF NONLINEAR BOUNDARY VALUE PROBLEM WITH FINITE FRACTIONAL DIFFERENCE

He, Yansheng Hou, Chengmin 2015년

논문상세정보
인용/피인용
' MULTIPLE POSITIVE SOLUTIONS OF NONLINEAR BOUNDARY VALUE PROBLEM WITH FINITE FRACTIONAL DIFFERENCE' 의 주제별 논문영향력
논문영향력 선정 방법
논문영향력 요약
주제
  • boundaryvalueproblem
  • fixed-point
  • fractional
  • multiple solutions
동일주제 총논문수 논문피인용 총횟수 주제별 논문영향력의 평균
19 0

0.0%

' MULTIPLE POSITIVE SOLUTIONS OF NONLINEAR BOUNDARY VALUE PROBLEM WITH FINITE FRACTIONAL DIFFERENCE' 의 참고문헌

  • Two-point boundary value problems for finite fractional difference equations
    F. M. Atici J. Difference Equ. Appl 17 : 445 ~ 456 [2011]
  • Two-point boundary value problems for finite fractional difference equations
    F. M. Atici Journal of Difference Equations and Applications 17 (4) : 445 ~ 456 [2011]
  • Three symmetric positive solutions for a second-order boundary value problem
    R. I. Avery Appl. Math. Lett 13 (3) : 1 ~ 7 [2000]
  • Three Positive Fixed Points of Nonlinear Operators on Ordered Banach Spaces
    R. I. Avery Computers and Mathematics with Ap-plications 42 : 313 ~ 322 [2001]
  • The Theory of Discrete Fractional Calculus: Development and Ap-plication
    M. Holm DigitalCommons@University of Nebraska-Lincoln [2011]
  • Systems of semipositone discrete fractional boundary value problems
    Rajendra Dahal Journal of Difference Equations and Applications 20 (3) : 473 ~ 491 [2013]
  • Sum and difference compositions and applications in discrete frac-tional calculus
    M. Holm Cubo 13 : 153 ~ 184 [2011]
  • Solvability of Nonlocal Fractional Boundary Value Problems
    Zh. Huang Discrete Dynamics in Nature and Society 2013 : 9 ~
  • Solutions to a discrete right-focal fractional boundary value problem
    C. S. Goodrich Int. J. Difference Equ 5 : 195 ~ 216 [2010]
  • Positive solutions for a class of boundary value problems with fractional q-differences
    R. A. C. Ferreira Comput. Math. Appl 61 : 367 ~ 373 [2011]
  • Positive solution for a discrete fractional periodic boundary value problem
    R. A. C. Ferreira Dyn. Contin. Discrete Impuls. Syst. Ser. A Math. Anal 19 : 545 ~ 557 [2012]
  • Positive Solutions of Differential. Difference and Integral Equations
    R. P. Agarwal Kluwer Academic [1999]
  • Positive Solutions of Differen-tial, Difference, Intergral Equations
    R. P. Agarwal Kluwer Academic [1999]
  • On semipositone discrete fractional boundary value problems with nonlocal boundary conditions
    C. S. Goodrich J. Difference Equ. Appl 19 : 1758 ~ 1780 [2013]
  • On discrete sequential fractional boundary value problems
    C. S. Goodrich Journal of Mathematical Analysis and Applications 385 (1) : 111 ~ 124 [2012]
  • On a fractional boundary value problem with fractional bound-ary conditions
    C. S. Goodrich Appl. Math. Lett 25 : 1101 ~ 1105 [2012]
  • On a first-order semipositone discrete fractional boundary value problem
    C. S. Goodrich Arch. Math. (Basel) 99 : 509 ~ 518 [2012]
  • On a discrete fractional three-point boundary value problem
    C. S. Goodrich J. Difference Equ. Appl 18 : 397 ~ 415 [2012]
  • Nontrivial solutions for fractional q-difference boundary value problems
    R. A. C. Ferreira Electron. J. Qual. Theory Differ. Equ : 10 ~ [2010]
  • Nonlinear Functional Analysis and Its Applications, I: Fixed-Point Theorems
    E. Zeidler Springer-Verlag [1993]
  • Multiple symmetric positive solutions for a second order boundary value problem
    Thompson, H. B. Henderson, J. Proceedings American Mathematical Society 128 : 2373 ~ 2379 [2000]
  • Multiple solutions for a fractional difference bound-ary value problem via variational approach
    Z. Xie Abstract and Applied Analysis 2012 : 16 ~
  • Multiple positive solutions for higher order boundary value prob-lems
    E. Kaufmann Rocky Mountain J. Math 28 : 1017 ~ 1028 [1998]
  • Multiple positive fixed points of nonlinear operators on ordered Banach spaces
    R. W. Leggett Indiana Univ. Math. J 28 : 673 ~ 688 [1979]
  • Modeling with fractional difference equations
    F. M. Atic Journal of Mathematical Analysis and Applications 369 : 1 ~ 9 [2010]
  • Linear systems of fractional nabla difference equa-tions
    F. M. Atici Rocky Mountain J. Math 41 : 353 ~ 370 [2011]
  • Fractional h-difference equations arising from the calculus of variations
    R. A. C. Ferreira Appl. Anal. Discrete Math 5 : 110 ~ 121 [2011]
  • Existence of a positive solution to a system of discrete fractional boundary value problems
    C. S. Goodrich Appl. Math. Comput 217 : 4740 ~ 4753 [2011]
  • Existence and uniqueness of solutions to a fractional difference equation with nonlocal conditions
    C. S. Goodrich Computers and Mathematics with Applica-tions 61 (2) : 191 ~ 202 [2011]
  • Existence and uniqueness of solution to some discrete frac-tional boundary value problems of order less than one
    R. A. C. Ferreira J. Difference Equ. Appl 19 : 712 ~ 718 [2013]
  • Discrete fractional calculus with the nabla operator
    F. M. Atici Electron. J. Qual. Theory Differ. Equ. Spec. Ed 1 (3) : 1 ~ 12 [2009]
  • Continuity of solutions to discrete fractional initial value prob-lems
    C. S. Goodrich Comput. Math. Appl 59 : 3489 ~ 3499 [2010]
  • A transform method in discrete fractional calculus
    F. M. Atici Int. J. Difference Equ 2 (2) : 165 ~ 176 [2007]
  • A generalization of the Leggett-Williams fixed point theorem
    R. I. Avery MSR Hotline 2 : 9 ~ 14 [1998]
  • A discrete fractional Gronwall inequality
    R. A. C. Ferreira Proc. Amer. Math. Soc 140 : 1605 ~ 1612 [2012]