Araştırma Makalesi

Existence results for Navier problems with degenerated (p,q)-Laplacian and (p,q)-Biharmonic operators

Cilt: 1 Sayı: 2 31 Ağustos 2018
Results in Nonlinear Analysis Kapak
Results in Nonlinear Analysis
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EN

Existence results for Navier problems with degenerated (p,q)-Laplacian and (p,q)-Biharmonic operators

Abstract

In this article, we prove the existence and uniqueness of solutions for the Navier problem
(P)





ω(x)(|∆u|
p−2∆u + |∆u|
q−2∆u)

− div
ω(x)(|∇u|
p−2∇u + |∇u|
q−2∇u)

= f(x) − div(G(x)), in Ω,
u(x) = ∆u = 0, in ∂Ω,
where Ω is a bounded open set of R
N (N ≥ 2), f
ω
∈L
p
0
(Ω, ω) and G
ω
∈ [L
q
0
(Ω, ω)]N .

Keywords

Kaynakça

  1. {1} A.C.Cavalheiro, Existence and uniqueness ofsolutions for some degenerate nonlinear Dirichlet problems},Journal of Applied Analysis, 19 (2013), 41-54.
  2. {2} M. Chipot, Elliptic Equations: An IntroductoryCourse, Birkh\"auser, Berlin (2009).
  3. {3} P. Drábek, A. Kufner and F. Nicolosi, Quasilinear Elliptic Equations with Degenerations andSingularities, Walter de Gruyter, Berlin (1997).
  4. {4} E. Fabes, C. Kenig, R. Serapioni, The localregularity of solutions of degenerate elliptic equations, Comm.PDEs 7 (1982), 77-116.
  5. {5} J. Garcia-Cuerva and J.L. Rubio de Francia, Weighted Norm Inequalities and Related Topics, North-HollandMathematics Studies 116, (1985).
  6. {6} D.Gilbarg and N.S. Trudinger, Elliptic PartialEquations of Second Order, 2nd Ed., Springer, New York (1983).
  7. {7} J. Heinonen, T. Kilpelainen and O. Martio,\textit{Nonlinear Potential Theory of Degenerate EllipticEquations, Oxford Math. Monographs, Clarendon Press, (1993).
  8. {8} B. Muckenhoupt, Weighted norm inequalities for theHardy maximal function, Trans. Am. Math. Soc. 165 (1972),207-226.

Ayrıntılar

Birincil Dil

İngilizce

Konular

Matematik

Bölüm

Araştırma Makalesi

Yazarlar

Yayımlanma Tarihi

31 Ağustos 2018

Gönderilme Tarihi

4 Haziran 2018

Kabul Tarihi

9 Ağustos 2018

Yayımlandığı Sayı

Yıl 2018 Cilt: 1 Sayı: 2

IZ

https://izlik.org/JA66YF77GZ

Kaynak Göster

RIS / Bibtex
APA
Cavalheiro, A. C. (2018). Existence results for Navier problems with degenerated (p,q)-Laplacian and (p,q)-Biharmonic operators. Results in Nonlinear Analysis, 1(2), 74-87. https://izlik.org/JA66YF77GZ
AMA
1.Cavalheiro AC. Existence results for Navier problems with degenerated (p,q)-Laplacian and (p,q)-Biharmonic operators. RNA. 2018;1(2):74-87. https://izlik.org/JA66YF77GZ
Chicago
Cavalheiro, Albo Carlos. 2018. “Existence results for Navier problems with degenerated (p,q)-Laplacian and (p,q)-Biharmonic operators”. Results in Nonlinear Analysis 1 (2): 74-87. https://izlik.org/JA66YF77GZ.
EndNote
Cavalheiro AC (01 Ağustos 2018) Existence results for Navier problems with degenerated (p,q)-Laplacian and (p,q)-Biharmonic operators. Results in Nonlinear Analysis 1 2 74–87.
IEEE
[1]A. C. Cavalheiro, “Existence results for Navier problems with degenerated (p,q)-Laplacian and (p,q)-Biharmonic operators”, RNA, c. 1, sy 2, ss. 74–87, Ağu. 2018, [çevrimiçi]. Erişim adresi: https://izlik.org/JA66YF77GZ
ISNAD
Cavalheiro, Albo Carlos. “Existence results for Navier problems with degenerated (p,q)-Laplacian and (p,q)-Biharmonic operators”. Results in Nonlinear Analysis 1/2 (01 Ağustos 2018): 74-87. https://izlik.org/JA66YF77GZ.
JAMA
1.Cavalheiro AC. Existence results for Navier problems with degenerated (p,q)-Laplacian and (p,q)-Biharmonic operators. RNA. 2018;1:74–87.
MLA
Cavalheiro, Albo Carlos. “Existence results for Navier problems with degenerated (p,q)-Laplacian and (p,q)-Biharmonic operators”. Results in Nonlinear Analysis, c. 1, sy 2, Ağustos 2018, ss. 74-87, https://izlik.org/JA66YF77GZ.
Vancouver
1.Albo Carlos Cavalheiro. Existence results for Navier problems with degenerated (p,q)-Laplacian and (p,q)-Biharmonic operators. RNA [Internet]. 01 Ağustos 2018;1(2):74-87. Erişim adresi: https://izlik.org/JA66YF77GZ