Record link: 
http://hdl.handle.net/20.500.12708/201604
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Title: 
Comparison Principle for General Nonlocal Hamilton-Jacobi Equations with Superlinear Gradient
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Citation: 
Ciomaga, A., Le, M. T., Ley, O., & Topp, E. (2024). Comparison Principle for General Nonlocal Hamilton-Jacobi Equations with Superlinear Gradient. arXiv. https://doi.org/10.48550/arXiv.2409.11124
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Publisher DOI: 
10.48550/arXiv.2409.11124
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Publication Type: 
Preprint
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Language: 
English
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Authors: 
Ciomaga, Adina 
Le, Minh Tri 
Ley, Oliver 
Topp, Erwin 
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Organisational Unit: 
E105-04 - Forschungsbereich Variationsrechnung, Dynamische Systeme und Operations Research 
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ArXiv ID: 
2409.11124v1
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Date (published): 
17-Sep-2024
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Number of Pages: 
37
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Preprint Server: 
arXiv 
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Keywords: 
nonlinear integro-differential equations; comparison principle; viscosity solutions
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Abstract: 
We obtain the comparison principle for discontinuous viscosity sub- and supersolutions of nonlocal Hamilton-Jacobi equations, with superlinear and coercive gradient terms. The nonlocal terms are integro-differential operators in Lévy form, with general measures: x-dependent, possibly degenerate and without any restriction on the order. The measures must satisfy a combined Wasserstein/Total Variation-continuity assumption, which is one of the weakest conditions used in the context of viscosity approach for this type of integro-differential PDEs. The proof relies on a regularizing effect due to the gradient growth. We present several examples of applications to PDEs with different types of nonlocal operators (measures with density, operators of variable order, Lévy-Itô operators).
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Research Areas: 
Mathematical and Algorithmic Foundations: 100%
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Science Branch: 
1010 - Mathematik: 100%
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