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The use of fractional integral operators for solving nonhomogeneous differential equations
Although results using fractional integral operators can always be obtained by other methods, the succinct simplicity of the formulation may often suggest approaches which might not be evident in a classical approach. In this note homogeneous fractional integral operators and a homogeneous integral operator related to the Laplace transform are defined and some applications to nonhomogeneous differential equations are given. (Author).
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- http://experiment.worldcat.org/entity/work/data/137219760#Topic/operators_mathematics
- http://experiment.worldcat.org/entity/work/data/137219760#Topic/numerical_mathematics
- http://experiment.worldcat.org/entity/work/data/137219760#Topic/series_mathematics
- http://experiment.worldcat.org/entity/work/data/137219760#Topic/transformations_mathematics
- http://experiment.worldcat.org/entity/work/data/137219760#Topic/efficiency
- http://experiment.worldcat.org/entity/work/data/137219760#Topic/differential_equations
- http://experiment.worldcat.org/entity/work/data/137219760#Topic/integral_transforms
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- "Although results using fractional integral operators can always be obtained by other methods, the succinct simplicity of the formulation may often suggest approaches which might not be evident in a classical approach. In this note homogeneous fractional integral operators and a homogeneous integral operator related to the Laplace transform are defined and some applications to nonhomogeneous differential equations are given. (Author)."@en
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- "The use of fractional integral operators for solving nonhomogeneous differential equations"@en