On the characterization of constant functions through nonlocal functionals
Abstract
We address a classical open question by H. Brezis and R. Ignat concerning the characterization of constant functions through double integrals that involve difference quotients.
Our first result is a counterexample to the question in its full generality. This counterexample requires the construction of a function whose difference quotients avoid a sequence of intervals with endpoints that diverge to infinity. Our second result is a positive answer to the question when restricted either to functions that are bounded and approximately differentiable almost everywhere, or to functions with bounded variation.
We also present some related open problems that are motivated by our positive and negative results.
References
- 1. ,
Another look at Sobolev spaces , in Optimal Control and Partial Differential Equations (IOS Press, Amsterdam, 2001), pp. 439–455. Google Scholar - 2. , How to recognize constant functions. A connection with Sobolev spaces, Uspekhi Mat. Nauk 57(4) (2002) 59–74. Google Scholar
- 3. , Degree and Sobolev spaces, Topol. Methods Nonlinear Anal. 13(2) (1999) 181–190. Crossref, Google Scholar
- 4. H. Brezis, A. Seeger, J. Van Schaftingen and P.-L. Yung, Families of functionals representing Sobolev norms, preprint (2021), arXiv:2109.02930. Google Scholar
- 5. , Going to Lorentz when fractional Sobolev, Gagliardo and Nirenberg estimates fail, Calc. Var. Partial Differential Equations 60(4) (2021) 129. Crossref, Web of Science, Google Scholar
- 6. , An elementary proof of a characterization of constant functions, Adv. Nonlinear Stud. 8(3) (2008) 597–602. Crossref, Web of Science, Google Scholar
- 7. , Geometric Measure Theory,
Die Grundlehren der Mathematischen Wissenschaften, Band 153 (Springer-Verlag, New York, 1969). Google Scholar - 8. , On an open problem about how to recognize constant functions, Houston J. Math. 31(1) (2005) 285–304. Web of Science, Google Scholar
- 9. , Heat kernels on metric spaces and a characterisation of constant functions, Manuscripta Math. 115(3) (2004) 389–399. Crossref, Web of Science, Google Scholar
- 10. , An integral type characterization of constant functions on metric-measure spaces, J. Math. Anal. Appl. 385(1) (2012) 194–201. Crossref, Web of Science, Google Scholar
- 11. , A remark on the Bourgain–Brezis–Mironescu characterization of constant functions, Houston J. Math. 46(1) (2020) 113–115. Web of Science, Google Scholar
Remember to check out the Most Cited Articles! |
---|
Be inspired by these NEW Mathematics books for inspirations & latest information in your research area! |