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All issues Volume 32 (2026) ESAIM: COCV, 32 (2026) 29 References
Open Access
Issue
ESAIM: COCV
Volume 32, 2026
Article Number 29
Number of page(s) 22
DOI https://doi.org/10.1051/cocv/2026010
Published online 10 April 2026
  1. G. Aronson, Extension of functions satisfying lipschitz conditions. Ark. Mat. 6 (1967) 551–561. [CrossRef] [MathSciNet] [Google Scholar]
  2. G. Aronson, On the partial differential equation ux2uxx + 2uxuyuxy + uy2uyy = 0. Manuscr. Mat. 47 (1954) 133–151. [Google Scholar]
  3. E.N. Barron, Viscosity solutions and analysis in L. Nonlinear Analysis, Differential Equations and Control. Dordrecht (1999). [Google Scholar]
  4. E.N. Barron, L.C. Evans and R. Jensen, The infinity Laplacian, Aronsson's equation and their generalizations. Trans. Am. Math. Soc. 36 (2008) 77–101. [Google Scholar]
  5. M.G. Crandall, L.C. Evans and R.F. Gariepy, Optimal Lipschitz extensions and the infinity Laplacian. Calc. Var. Partial Diff. Equ. 13 (2001) 123–139. [Google Scholar]
  6. T. Bhattacharya, E. DiBenedetto and J. Manfredi, Limits as p ? 8 of ?pup = f and related extremal problems. Rend. Sem. Mat. Univ. Politec. Torino (1989), no. Special Issue, 15–68 (1991), Some topics in nonlinear PDEs (Turin, 1989). [Google Scholar]
  7. C. Bjorland, L. Caffarelli and A. Figalli, Nonlocal tug-of-war and the infinity fractional Laplacian. Commun. Pure Appl. Math. 65 (2012) 337–380. [Google Scholar]
  8. Y. Peres, O. Schramm, S. Sheffield and D.B. Wilson, Tug-of-War and the Infinity Laplacian. Selected Works of Oded Schramm. Selected Works in Probability and Statistics. Springer (2011). [Google Scholar]
  9. H. Antil, R. Khatri and M. Warma, External optimal control of nonlocal PDEs. Inverse Probl. 35 (2019) 084003. [Google Scholar]
  10. S. Aleotti, A. Buccini and M. Donatelli, Fractional graph Laplacian for image reconstruction. Appl. Numer. Math. 200 (2024) 43–57. [Google Scholar]
  11. E. Abdo, F.N. Lee and W. Wang, On the global well-posedness and analyticity of some electrodiffusion models in ideal fluids and porous media. SIAM J. Math. Anal. 55 (2023) 6838–6866. [Google Scholar]
  12. J.L. Vázquez, Nonlinear Diffusion with Fractional Laplacian Operators. Nonlinear Partial Differential Equations: The Abel Symposium 2010. Springer Berlin Heidelberg (2012). [Google Scholar]
  13. A. Chambolle, E. Lindgren and R. Monneau, A Holder infinity Laplacian. Optim. Calc. Var. 18 (2012) 799–835. [Google Scholar]
  14. L.M. Mérida and R.E. Vidal, The obstacle problem for the infinity fractional Laplacian. Rend. Circ. Mat. Palermo II. Ser. 67 (2018) 7–15. [Google Scholar]
  15. F. Fejne, On the comparison principle for a nonlocal infinity Laplacian, Preprint (2025) arXiv:2501.04506. [Google Scholar]
  16. M.G. Crandall, H. Ishii and P.L. Lions, User's guide to viscosity solutions of second order partial differential equations. Bull. Am,. Math. Soc. 27 (1992) 1–67. [Google Scholar]
  17. N.M.L. Diehl and R. Teymurazyan, Reaction–diffusion equations for the infinity Laplacian. Nonlinear Anal. 199 (2020) 111956. [Google Scholar]

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