Talk:Young's convolution inequality

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Should we consider replacing ${\displaystyle \mathbb {R} ^{d}}$ with ${\displaystyle G}$ for any locally compact abelian group ${\displaystyle G}$? Given the fact that Young's inequality is used not only for ${\displaystyle \mathbb {R} ^{d}}$ but also ${\displaystyle \mathbb {Z} ^{d}}$ and sometimes even ${\displaystyle \mathbb {T} ^{d}}$, I think the theorem would be better formulated with a higher level of generality than it currently is. — Preceding unsigned comment added by 79.68.238.151 (talk) 12:22, 19 August 2017 (UTC)[reply]

I think it should be mentioned in the article that, let ${\displaystyle L_{p}(\mathbb {R} ^{d}):={\begin{cases}L^{p}(\mathbb {R} ^{d}),&1\leq p<\infty \\C_{0}(\mathbb {R} ^{d}),&p=\infty \end{cases}}}$ where ${\displaystyle C_{0}(\mathbb {R} ^{d})}$ is the space of continue functions that vanish at infinity (note that the dual space of ${\displaystyle L_{p}(\mathbb {R} ^{d})}$ is ${\displaystyle L^{p'}(\mathbb {R} ^{d})}$, where ${\displaystyle p'}$ is the dual index of ${\displaystyle p}$; I believe that ${\displaystyle (C_{0}(X))^{*}=L^{1}(X)}$ for any ${\displaystyle X}$ whose measure and topology cooperate well), then we actually have ${\displaystyle 1\leq p,q,r\leq \infty }$, ${\displaystyle {\dfrac {1}{p}}+{\dfrac {1}{q}}=1+{\dfrac {1}{r}}}$ implying ${\displaystyle L_{p}(\mathbb {R} ^{d})*L_{q}(\mathbb {R} ^{d})\subset L_{r}(\mathbb {R} ^{d})}$ (see here). For ${\displaystyle L^{1}(\mathbb {R} ^{d})}$ and ${\displaystyle L^{\infty }(\mathbb {R} ^{d})}$ we only know that the convolution is continuous and bounded (take ${\displaystyle g}$ to be constant, for example).

This link may be relevant, but I'm not sure. 129.104.241.214 (talk) 22:11, 15 February 2024 (UTC)[reply]

It's confusing that the symbol r is used twice, both for an exponent and for its conjugate exponent. In the "duality formulation" (the second in the article), the r that appears there is the conjugate exponent of the r in the first inequality. I propose changing the second r to s. Ulrigo (talk) 14:36, 20 March 2024 (UTC)[reply]