Harnack inequality for polyharmonic equations

Jiamin Zeng; Runjie Zheng; Yi Fang

doi:10.52396/JUSTC-2022-0114

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Open Access JUSTC Mathematics 14 June 2023

Harnack inequality for polyharmonic equations

Department of Mathematics, Anhui University of Technology, Ma’anshan 243002, China

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https://doi.org/10.52396/JUSTC-2022-0114

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Author Bio:
Jiamin Zeng is currently a postgraduate student at Anhui University of Technology. His research mainly focuses on elliptic partial differential equations

Yi Fang is an Associate Professor at Anhui University of Technology. He received his Ph.D. degree from the University of Science and Technology of China in 2015. His research mainly focuses on elliptic partial differential equations
Corresponding author: E-mail: yif1915@ahut.edu.cn
Received Date: 08 August 2022
Accepted Date: 17 November 2022

Available Online: 14 June 2023

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Abstract

Abstract

Some new types of mean value formulas for the polyharmonic functions were established. Based on the formulas, the Harnack inequality for the nonnegative solutions to the polyharmonic equations was proved.

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Harnack inequality.

Abstract

Some new types of mean value formulas for the polyharmonic functions were established. Based on the formulas, the Harnack inequality for the nonnegative solutions to the polyharmonic equations was proved.

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Some new type mean value formulas for polyharmonic functions were established.
The Harnack inequality for polyharmonic functions was proved.

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References

[1]	Han Q, Lin F. Elliptic Partial Differential Equations. 2nd edition. Providence, RI: American Mathematical Society, 2011.
[2]	Gilbarg D, Trudinger N. Elliptic Partial Differential Equations of Second Order. Berlin: Springer Verlag, 1983.
[3]	Caristi G, Mitidieri E. Harnack inequality and applications to solutions of biharmonic equations. In: Partial Differential Equations and Functional Analysis. Basel, Switzerland: Birkhäuser Verlag, 2006.
[4]	Karachik V V. On the mean value property for polyharmonic functions in the ball. Siberian Advances in Mathematics, 2014, 24 (3): 169–182. doi: 10.3103/S1055134414030031
[5]	Łysik G. On the mean value property for polyharmonic functions. Acta Math. Hung., 2011, 133: 133–139. doi: 10.1007/s10474-011-0138-7
[6]	Wei J, Xu X. Classification of solutions of higher order conformally invariant equations. Math. Ann., 1999, 313: 207–228. doi: 10.1007/s002080050258
[7]	Simader C G. Mean value formulas, Weyl’s lemma and Liouville theorems for δ² and Stokes’ system. Results in Mathematics, 1992, 22: 761–780. doi: 10.1007/BF03323122

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[1]	Han Q, Lin F. Elliptic Partial Differential Equations. 2nd edition. Providence, RI: American Mathematical Society, 2011.
[2]	Gilbarg D, Trudinger N. Elliptic Partial Differential Equations of Second Order. Berlin: Springer Verlag, 1983.
[3]	Caristi G, Mitidieri E. Harnack inequality and applications to solutions of biharmonic equations. In: Partial Differential Equations and Functional Analysis. Basel, Switzerland: Birkhäuser Verlag, 2006.
[4]	Karachik V V. On the mean value property for polyharmonic functions in the ball. Siberian Advances in Mathematics, 2014, 24 (3): 169–182. doi: 10.3103/S1055134414030031
[5]	Łysik G. On the mean value property for polyharmonic functions. Acta Math. Hung., 2011, 133: 133–139. doi: 10.1007/s10474-011-0138-7
[6]	Wei J, Xu X. Classification of solutions of higher order conformally invariant equations. Math. Ann., 1999, 313: 207–228. doi: 10.1007/s002080050258
[7]	Simader C G. Mean value formulas, Weyl’s lemma and Liouville theorems for δ² and Stokes’ system. Results in Mathematics, 1992, 22: 761–780. doi: 10.1007/BF03323122

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