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      On the Definitions of Nabla Fractional Operators

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      Abstract and Applied Analysis
      Hindawi Limited

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          Abstract

          We show that two recent definitions of discrete nabla fractional sum operators are related. Obtaining such a relation between two operators allows one to prove basic properties of the one operator by using the known properties of the other. We illustrate this idea with proving power rule and commutative property of discrete fractional sum operators. We also introduce and prove summation by parts formulas for the right and left fractional sum and difference operators, where we employ the Riemann-Liouville definition of the fractional difference. We formalize initial value problems for nonlinear fractional difference equations as an application of our findings. An alternative definition for the nabla right fractional difference operator is also introduced.

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          Initial value problems in discrete fractional calculus

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            On Riemann and Caputo fractional differences

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              Modeling with fractional difference equations

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                Author and article information

                Journal
                Abstract and Applied Analysis
                Abstract and Applied Analysis
                Hindawi Limited
                1085-3375
                1687-0409
                2012
                2012
                : 2012
                :
                : 1-13
                Article
                10.1155/2012/406757
                950846f9-dbe6-4980-adc7-12d3a89b74f0
                © 2012

                http://creativecommons.org/licenses/by/3.0/

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