Finite element approximation of fractional order elliptic boundary value problems

Szekeres, Béla J.; Izsák, Ferenc

doi:10.1016/j.cam.2015.07.026

Cited by 11 publications

(7 citation statements)

References 37 publications

(45 reference statements)

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“…Attekintjük a különböző modellekhez tartozó numerikus módszereket. Az első hatékony eljárást a [12] munkában közölték, amelynek alapgondolata, hogy el kell tolni a véges differenciában szereplő együtthatókat valamilyen p ∈ Z + paraméterrel: [12]és [17], a másodikéhoz a [14]és [15] munkákat idézzük.…”

Section: A Modellek Vizsgálataunclassified

Törtrendű diffúzió modelljei és szimulációja

Izsák¹,

Szekeres²

2019

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Section: A Modellek Vizsgálataunclassified

Törtrendű diffúzió modelljei és szimulációja

Izsák¹,

Szekeres²

2019

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“…The use of finite element approximations for fractional power elliptic operators is discussed in detail, for instance, in the works Acosta and Borthagaray (2017); Szekeres and Izsák (2016).…”

Section: Problem Formulationmentioning

confidence: 99%

“…For approximation in space, we can apply finite volume or finite element methods oriented to using arbitrary domains and irregular computational grids (Knabner and Angermann (2003); Quarteroni and Valli (1994)). After this, we formulate the corresponding Cauchy problem with a fractional power of a self-adjoint positive definite discrete elliptic operator (see Bonito and Pasciak (2015); Szekeres and Izsák (2016)) -a fractional power of a symmetric positive definite matrix (Higham (2008)).…”

Section: Introductionmentioning

confidence: 99%

Numerical Solution of Time-Dependent Problems with Fractional Power Elliptic Operator

Vabishchevich

2017

Computational Methods in Applied Mathematics

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An unsteady problem is considered for a space-fractional equation in a bounded domain. A first-order evolutionary equation involves a fractional power of an elliptic operator of second order. Finite element approximation in space is employed. To construct approximation in time, standard two-level schemes are used. The approximate solution at a new time-level is obtained as a solution of a discrete problem with the fractional power of the elliptic operator. A Padetype approximation is constructed on the basis of special quadrature formulas for an integral representation of the fractional power elliptic operator using explicit schemes. A similar approach is applied in the numerical implementation of implicit schemes. The results of numerical experiments are presented for a test two-dimensional problem.

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“…In the past few decades, boundary value problems of fractional order involving a variety of boundary conditions have been studied by several researchers. We refer the readers to [9][10][11][12][13][14][15] and the references cited therein. Moreover,the existence of solutions to the fractional differential equations with anti-periodic boundary value conditions has been studied by many authors (see [16][17][18][19][20][21]).…”

Section: Introductionmentioning

confidence: 99%

Periodic boundary value problems for two classes of nonlinear fractional differential equations

2018

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By using the coincidence degree theorem, we obtain a new result on the existence of solutions for a class of fractional differential equations with periodic boundary value conditions, where a certain nonlinear growth condition of the nonlinearity needs to be satisfied. Furthermore, we study another class of differential equations of fractional order with periodic boundary conditions at resonance. A new result on the existence of positive solutions is presented by use of a Leggett-Williams norm-type theorem for coincidences. Two examples are given to illustrate the main result at the end of this paper.

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Finite element approximation of fractional order elliptic boundary value problems

Cited by 11 publications

References 37 publications

Törtrendű diffúzió modelljei és szimulációja

Törtrendű diffúzió modelljei és szimulációja

Numerical Solution of Time-Dependent Problems with Fractional Power Elliptic Operator

Periodic boundary value problems for two classes of nonlinear fractional differential equations

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