1-dimensional Harnack estimates

Fatma Gamze Düzgün; Ugo Gianazza; Vincenzo Vespri

doi:10.3934/dcdss.2016021

1-dimensional Harnack estimates

Fatma Gamze Düzgün
, Ugo Gianazza
, Vincenzo Vespri

Fonksiyonlar Teorisi ve Fonksiyonel Analiz Anabilim Dalı

Araştırma sonucu: Dergiye katkı › Makale › bilirkişi

2 Alıntılar (Scopus)

Özet

Let u be a non-negative super-solution to a 1-dimensional singular parabolic equation of p-Laplacian type (1 < p < 2). If u is bounded below on a time-segment fyg-y} (0, T] by a positive number M, then it has a powerlike decay of order p/2-p with respect to the space variable x in ℝ × [T/2, T]. This fact, stated quantitatively in Proposition 1.2, is a "sidewise spreading of positivity" of solutions to such singular equations, and can be considered as a form of Harnack inequality. The proof of such an effect is based on geometrical ideas.

Orijinal dil	İngilizce
Sayfa (başlangıç-bitiş)	675-685
Sayfa sayısı	11
Dergi	Discrete and Continuous Dynamical Systems - Series S
Hacim	9
Basın numarası	3
DOI'lar	https://doi.org/10.3934/dcdss.2016021
Yayın durumu	Yayınlandı - Haz 2016

Belgeye Erişim

10.3934/dcdss.2016021

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title = "1-dimensional Harnack estimates",

abstract = "Let u be a non-negative super-solution to a 1-dimensional singular parabolic equation of p-Laplacian type (1 < p < 2). If u is bounded below on a time-segment fyg-y\} (0, T] by a positive number M, then it has a powerlike decay of order p/2-p with respect to the space variable x in ℝ × [T/2, T]. This fact, stated quantitatively in Proposition 1.2, is a {"}sidewise spreading of positivity{"} of solutions to such singular equations, and can be considered as a form of Harnack inequality. The proof of such an effect is based on geometrical ideas.",

keywords = "Expansion of positivity, P-Laplacian, Singular diffusion equations",

author = "D{\"u}zg{\"u}n, \{Fatma Gamze\} and Ugo Gianazza and Vincenzo Vespri",

year = "2016",

month = jun,

doi = "10.3934/dcdss.2016021",

language = "English",

volume = "9",

pages = "675--685",

journal = "Discrete and Continuous Dynamical Systems - Series S",

issn = "1937-1632",

publisher = "American Institute of Mathematical Sciences",

number = "3",

}

TY - JOUR

T1 - 1-dimensional Harnack estimates

AU - Düzgün, Fatma Gamze

AU - Gianazza, Ugo

AU - Vespri, Vincenzo

PY - 2016/6

Y1 - 2016/6

N2 - Let u be a non-negative super-solution to a 1-dimensional singular parabolic equation of p-Laplacian type (1 < p < 2). If u is bounded below on a time-segment fyg-y} (0, T] by a positive number M, then it has a powerlike decay of order p/2-p with respect to the space variable x in ℝ × [T/2, T]. This fact, stated quantitatively in Proposition 1.2, is a "sidewise spreading of positivity" of solutions to such singular equations, and can be considered as a form of Harnack inequality. The proof of such an effect is based on geometrical ideas.

AB - Let u be a non-negative super-solution to a 1-dimensional singular parabolic equation of p-Laplacian type (1 < p < 2). If u is bounded below on a time-segment fyg-y} (0, T] by a positive number M, then it has a powerlike decay of order p/2-p with respect to the space variable x in ℝ × [T/2, T]. This fact, stated quantitatively in Proposition 1.2, is a "sidewise spreading of positivity" of solutions to such singular equations, and can be considered as a form of Harnack inequality. The proof of such an effect is based on geometrical ideas.

KW - Expansion of positivity

KW - P-Laplacian

KW - Singular diffusion equations

UR - https://www.scopus.com/pages/publications/84964671344

U2 - 10.3934/dcdss.2016021

DO - 10.3934/dcdss.2016021

M3 - Article

AN - SCOPUS:84964671344

SN - 1937-1632

VL - 9

SP - 675

EP - 685

JO - Discrete and Continuous Dynamical Systems - Series S

JF - Discrete and Continuous Dynamical Systems - Series S

IS - 3

ER -

1-dimensional Harnack estimates

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