Litcius/Paper detail

On the nonlinear Brascamp–Lieb inequality

Jonathan Bennett, Neal Bez, Stefan Buschenhenke, Michael G. Cowling, Taryn C. Flock

2020Duke Mathematical Journal23 citationsDOIOpen Access PDF

Abstract

We prove a nonlinear variant of the general Brascamp–Lieb inequality. Our proof consists of running an efficient, or “tight,” induction-on-scales argument, which uses the existence of Gaussian near-extremizers to the underlying linear Brascamp–Lieb inequality (Lieb’s theorem) in a fundamental way. A key ingredient is an effective version of Lieb’s theorem, which we establish via a careful analysis of near-minimizers of weighted sums of exponential functions. Instances of this inequality are quite prevalent in mathematics, and we illustrate this with some applications in harmonic analysis.

Topics & Concepts

MathematicsNonlinear systemInequalityApplied mathematicsExponential functionGaussianHarmonicLinear inequalityKey (lock)Chebyshev's inequalityLog sum inequalityHölder's inequalityKantorovich inequalityHarmonic meanHarmonic analysisMathematical analysisPure mathematicsCalculus (dental)Mathematical Analysis and Transform MethodsWireless Communication Security TechniquesNumerical methods in inverse problems
On the nonlinear Brascamp–Lieb inequality | Litcius