LEADER 01889nam 2200373 450 001 9910765799003321 005 20230218202844.0 010 $a3-03897-207-X 035 $a(CKB)5400000000000618 035 $a(NjHacI)995400000000000618 035 $a(EXLCZ)995400000000000618 100 $a20230218d2018 uy 0 101 0 $aeng 135 $aur||||||||||| 181 $ctxt$2rdacontent 182 $cc$2rdamedia 183 $acr$2rdacarrier 200 00$aFractional calculus $etheory and applications /$fedited by Francesco Mainardi 210 1$aBasel, Switzerland :$cMDPI,$d[2018] 210 4$dİ2018 215 $a1 online resource (208 pages) $cillustrations 320 $aIncludes bibliographical references. 330 $aFractional calculus is allowing integrals and derivatives of any positive order (the term fractional is kept only for historical reasons). It can be considered a branch of mathematical physics that deals with integro-differential equations, where integrals are of convolution type and exhibit mainly singular kernels of power law or logarithm type.It is a subject that has gained considerably popularity and importance in the past few decades in diverse fields of science and engineering. Efficient analytical and numerical methods have been developed but still need particular attention.The purpose of this Special Issue is to establish a collection of articles that reflect the latest mathematical and conceptual developments in the field of fractional calculus and explore the scope for applications in applied sciences. 517 $aFractional Calculus 606 $aFractional calculus 615 0$aFractional calculus. 676 $a515.83 702 $aMainardi$b Francesco 801 0$bNjHacI 801 1$bNjHacl 906 $aBOOK 912 $a9910765799003321 996 $aFractional calculus$9263674 997 $aUNINA