A new analytical approximate method for the solution of fractional differential equations. Oturanç, G., Kurnaz, A., & Keskin, Y. International Journal of Computer Mathematics, 85(1):131-142, 1, 2008.
Paper abstract bibtex 3 downloads Anewanalytical approximate method for the solution of fractional differential equations is presented. This method, which does not require any symbolic computation, is important as a tool for scientists and engineers because it provides an iterative procedure for obtaining the solution of both linear and non-linear fractional differential equations. The effectiveness of the proposed method is illustrated with some examples
@article{
id = {ac8c60de-6ea3-3bdf-941d-100f2e47e2e3},
title = {A new analytical approximate method for the solution of fractional differential equations},
type = {article},
year = {2008},
identifiers = {[object Object]},
keywords = {Adomian decom- position,Fractional differential equations,Fractional differential transformation,Non-integer order,Series solution},
created = {2012-10-10T10:40:47.000Z},
pages = {131-142},
volume = {85},
websites = {http://www.tandfonline.com/doi/abs/10.1080/00207160701405477},
month = {1},
accessed = {2012-10-10},
file_attached = {true},
profile_id = {bbe6377e-e0c2-3f20-91c0-7c08b607f7ca},
last_modified = {2012-10-15T12:28:47.000Z},
tags = {intcompmath},
read = {true},
starred = {false},
authored = {true},
confirmed = {true},
hidden = {false},
abstract = {Anewanalytical approximate method for the solution of fractional differential equations is presented. This method, which does not require any symbolic computation, is important as a tool for scientists and engineers because it provides an iterative procedure for obtaining the solution of both linear and non-linear fractional differential equations. The effectiveness of the proposed method is illustrated with some examples},
bibtype = {article},
author = {Oturanç, Galip and Kurnaz, Aydın and Keskin, Yıldıray},
journal = {International Journal of Computer Mathematics},
number = {1}
}
Downloads: 3
{"_id":{"_str":"52064294d40bcbb04100133a"},"__v":8,"authorIDs":["5461e00f8a9aab071c00014e"],"author_short":["Oturanç, G.","Kurnaz, A.","Keskin, Y."],"bibbaseid":"oturan-kurnaz-keskin-anewanalyticalapproximatemethodforthesolutionoffractionaldifferentialequations-2008","bibdata":{"id":"ac8c60de-6ea3-3bdf-941d-100f2e47e2e3","title":"A new analytical approximate method for the solution of fractional differential equations","type":"article","year":"2008","identifiers":"[object Object]","keywords":"Adomian decom- position,Fractional differential equations,Fractional differential transformation,Non-integer order,Series solution","created":"2012-10-10T10:40:47.000Z","pages":"131-142","volume":"85","websites":"http://www.tandfonline.com/doi/abs/10.1080/00207160701405477","month":"1","accessed":"2012-10-10","file_attached":"true","profile_id":"bbe6377e-e0c2-3f20-91c0-7c08b607f7ca","last_modified":"2012-10-15T12:28:47.000Z","tags":"intcompmath","read":"true","starred":false,"authored":"true","confirmed":"true","hidden":false,"abstract":"Anewanalytical approximate method for the solution of fractional differential equations is presented. This method, which does not require any symbolic computation, is important as a tool for scientists and engineers because it provides an iterative procedure for obtaining the solution of both linear and non-linear fractional differential equations. The effectiveness of the proposed method is illustrated with some examples","bibtype":"article","author":"Oturanç, Galip and Kurnaz, Aydın and Keskin, Yıldıray","journal":"International Journal of Computer Mathematics","number":"1","bibtex":"@article{\n id = {ac8c60de-6ea3-3bdf-941d-100f2e47e2e3},\n title = {A new analytical approximate method for the solution of fractional differential equations},\n type = {article},\n year = {2008},\n identifiers = {[object Object]},\n keywords = {Adomian decom- position,Fractional differential equations,Fractional differential transformation,Non-integer order,Series solution},\n created = {2012-10-10T10:40:47.000Z},\n pages = {131-142},\n volume = {85},\n websites = {http://www.tandfonline.com/doi/abs/10.1080/00207160701405477},\n month = {1},\n accessed = {2012-10-10},\n file_attached = {true},\n profile_id = {bbe6377e-e0c2-3f20-91c0-7c08b607f7ca},\n last_modified = {2012-10-15T12:28:47.000Z},\n tags = {intcompmath},\n read = {true},\n starred = {false},\n authored = {true},\n confirmed = {true},\n hidden = {false},\n abstract = {Anewanalytical approximate method for the solution of fractional differential equations is presented. This method, which does not require any symbolic computation, is important as a tool for scientists and engineers because it provides an iterative procedure for obtaining the solution of both linear and non-linear fractional differential equations. The effectiveness of the proposed method is illustrated with some examples},\n bibtype = {article},\n author = {Oturanç, Galip and Kurnaz, Aydın and Keskin, Yıldıray},\n journal = {International Journal of Computer Mathematics},\n number = {1}\n}","author_short":["Oturanç, G.","Kurnaz, A.","Keskin, Y."],"urls":{"Paper":"http://bibbase.org/service/mendeley/bbe6377e-e0c2-3f20-91c0-7c08b607f7ca/file/04229199-e491-798f-022c-f7836a09695d/A new analytical approximate method for the solution of fractional differential equations.pdf"},"bibbaseid":"oturan-kurnaz-keskin-anewanalyticalapproximatemethodforthesolutionoffractionaldifferentialequations-2008","role":"author","keyword":["Adomian decom- position","Fractional differential equations","Fractional differential transformation","Non-integer order","Series solution"],"downloads":3},"bibtype":"article","biburl":null,"downloads":3,"keywords":["adomian decom- position","fractional differential equations","fractional differential transformation","non-integer order","series solution"],"search_terms":["new","analytical","approximate","method","solution","fractional","differential","equations","oturanç","kurnaz","keskin"],"title":"A new analytical approximate method for the solution of fractional differential equations","year":2008}