04849nma a2200997 u 4500001001200000003002700012005001700039007002400056008004100080020001800121020002700139020001800166100002700184245009900211260008400310300003500394653002400429653003500453653002600488653004000514653001400554653004600568653002400614653003400638653000800672653002300680653003200703653002300735653002700758653002400785653002600809653002300835653001200858653003200870653001700902653003100919653002900950653005100979653002801030653002201058653007101080653003601151653004901187653003601236653001801272653001901290653001901309653001701328653003101345653006501376653005101441653001901492653003301511653002001544653002801564653002501592653004701617653004301664653003301707653002101740653002601761653002901787653003001816653004201846653002301888653001801911653002201929653001001951653002401961653003001985653001702015653004002032653001802072653002402090700002702114041001902141989004102160500007202201024003502273856009902308856007002407082000802477082000802485082000802493520135002501EB001991695EBX0100000000000000115459700000000000000.0cr|||||||||||||||||||||210512 ||| eng a9783039368839 abooks978-3-03936-883-9 a97830393688221 aSrivastava, Hari Mohan00aIntegral Transformations, Operational Calculus and Their ApplicationshElektronische Ressource aBasel, SwitzerlandbMDPI - Multidisciplinary Digital Publishing Institutec2020 a1 electronic resource (220 p.) a(δ,q)-neighborhood afuzzy comprehensive evaluation aρ-Laplace transforms aKorovkin-type approximation theorem aunit disk avehicle collaborative content downloading abivariate operators afunctional integral equations an/a aHankel determinant apositive integral operators aunivalent function aN-quasi convex modular arate of convergence aconvolution operators aperiodic solutions aweights aN-quasi semi-convex modular aconic region aVoronovskaja-type theorems aMittag-Leffler stability aHistory of engineering and technology / bicssc astatistical convergence aintegral operator astatistically and relatively modular deferred-weighted summability asymmetric differential operator afractional differential equations with input aStancu-type Bernstein operators amodular space aSimpson's rule asubordinations aconvex space adifferential subordination arelatively modular deferred-weighted statistical convergence ageneralized fractional differintegral operator aBanach algebra adifferential superordination aConvex function adifferentiable function aexponential function ameromorphic multivalent starlike functions aleft generalized fractional derivative adelay differential equations aHadamard product amodulus of continuity aapproximation properties ameasure of noncompactness aq-starlike functions of complex order aanalytic functions aBézier bases aanalytic function aVANET aq-integral operator aGeometric Function Theory aP-convergent aq-convex functions of complex order asubordination afixed point theorem1 aSrivastava, Hari Mohan07aeng2ISO 639-2 bDOABaDirectory of Open Access Books aCreative Commons (cc), https://creativecommons.org/licenses/by/4.0/8 a10.3390/books978-3-03936-883-942uhttps://directory.doabooks.org/handle/20.500.12854/68947zDOAB: description of the publication40uhttps://www.mdpi.com/books/pdfview/book/271470xVerlag3Volltext0 a9000 a6000 a620 aThis volume consists of a collection of 14 accepted submissions (including several invited feature articles) to the Special Issue of MDPI's journal Symmetry on the general subject area of integral transformations, operational calculus and their applications from many different parts around the world. The main objective of the Special Issue was to gather review, expository, and original research articles dealing with the state-of-the-art advances in integral transformations and operational calculus as well as their multidisciplinary applications, together with some relevance to the aspect of symmetry. Various families of fractional-order integrals and derivatives have been found to be remarkably important and fruitful, mainly due to their demonstrated applications in numerous diverse and widespread areas of mathematical, physical, chemical, engineering, and statistical sciences. Many of these fractional-order operators provide potentially useful tools for solving ordinary and partial differential equations, as well as integral, differintegral, and integro-differential equations; fractional-calculus analogues and extensions of each of these equations; and various other problems involving special functions of mathematical physics and applied mathematics, as well as their extensions and generalizations in one or more variables.