| Articolul precedent |
| Articolul urmator |
 |
 290 0 |
 SM ISO690:2012CERBU, Olga, BUTNARU, Dumitru. Lattice of factorization structures L(R). In: Mathematics and Information Technologies: Research and Education, Ed. 2021, 1-3 iulie 2021, Chişinău. Chișinău, Republica Moldova: 2021, p. 21. |
| EXPORT metadate: Google Scholar Crossref CERIF DataCite Dublin Core |
| Mathematics and Information Technologies: Research and Education 2021 | ||||||
|
Conferința "Mathematics and Information Technologies: Research and Education" 2021, Chişinău, Moldova, 1-3 iulie 2021 | ||||||
|
||||||
| Pag. 21-21 | ||||||
|
||||||
 Descarcă PDF |
||||||
| Rezumat | ||||||
We consider the following fractional differential inclusionformulawhere F(:; :) : [0; T] £ R ! P(R) is a set-valued map, D¾C F denotes CaputoFabrizio’s fractional derivative of order ¾ 2 (1; 2) and X0;X1 ½ R are closed sets. We prove that the reachable set of a certain variational fractional differential inclusion is a derived cone in the sense of Hestenes to the reachable set of the problem (1). In order to obtain the continuity property in the definition of a derived cone we shall use a continuous version of Filippov’s theorem for solutions of fractional differential inclusions (1). As an application we obtain a sufficient condition for local controllability along a reference trajectory |
||||||
|
DataCite XML Export
<?xml version='1.0' encoding='utf-8'?> <resource xmlns:xsi='http://www.w3.org/2001/XMLSchema-instance' xmlns='http://datacite.org/schema/kernel-3' xsi:schemaLocation='http://datacite.org/schema/kernel-3 http://schema.datacite.org/meta/kernel-3/metadata.xsd'> <creators> <creator> <creatorName>Cerbu, O.</creatorName> <affiliation>Universitatea de Stat din Moldova, Moldova, Republica</affiliation> </creator> <creator> <creatorName>Butnaru, D.</creatorName> <affiliation>Universitatea de Stat din Tiraspol, Moldova, Republica</affiliation> </creator> </creators> <titles> <title xml:lang='en'>Lattice of factorization structures L(R)</title> </titles> <publisher>Instrumentul Bibliometric National</publisher> <publicationYear>2021</publicationYear> <relatedIdentifier relatedIdentifierType='ISBN' relationType='IsPartOf'></relatedIdentifier> <dates> <date dateType='Issued'>2021</date> </dates> <resourceType resourceTypeGeneral='Text'>Conference Paper</resourceType> <descriptions> <description xml:lang='en' descriptionType='Abstract'><p>We consider the following fractional differential inclusion</p><p>formula</p><p>where F(:; :) : [0; T] £ R ! P(R) is a set-valued map, D¾C F denotes CaputoFabrizio’s fractional derivative of order ¾ 2 (1; 2) and X0;X1 ½ R are closed sets. We prove that the reachable set of a certain variational fractional differential inclusion is a derived cone in the sense of Hestenes to the reachable set of the problem (1). In order to obtain the continuity property in the definition of a derived cone we shall use a continuous version of Filippov’s theorem for solutions of fractional differential inclusions (1). As an application we obtain a sufficient condition for local controllability along a reference trajectory</p></description> </descriptions> <formats> <format>application/pdf</format> </formats> </resource>
|
|
|
