Iterated convolution inequalities on Rd and Riemannian Symmetric Spaces of non-compact type
Abstract
In a recent work (Int Math Res Not 24:18604-18612, 2021), Carlen-Jauslin-Lieb-Loss studied the convolution inequality f f*f on Rd and proved that the real integrable solutions of the above inequality must be non-negative and satisfy the non-trivial bound ∫Rd f 12. Nakamura-Sawano then generalized their result to m-fold convolution (J Geom Anal 35:68, 2025). In this article, we replace the monomials by genuine polynomials and study the real-valued solutions f ∈ L1(Rd) of the iterated convolution inequality equation* f Σn=2N an (*n f) \:, equation* where N 2 is an integer and for 2 n N, an are non-negative integers with at least one of them positive. We prove that f must be non-negative and satisfy the non-trivial bound ∫Rd f tQ\: where Q(t):=t-Σn=2N an\:tn and tQ is the unique zero of Q' in (0,∞). We also have an analogue of our result for Riemannian Symmetric Spaces of non-compact type. Our arguments involve Fourier Analysis and Complex analysis. We then apply our result to obtain an a priori estimate for solutions of an integro-differential equation which is related to the physical problem of the ground state energy of the Bose gas in the classical Euclidean setting.
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