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On a Conjecture of Bahri-Xu

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arxiv 2101.10023 v1 pith:2KE5WYV7 submitted 2021-01-25 math.CA math.DGmath.SP

On a Conjecture of Bahri-Xu

classification math.CA math.DGmath.SP
keywords conjecturebasiccaseprovethemadditionarbitrarybahri
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In order to study the Yamabe changing-sign problem, Bahri and Xu proposed a conjecture which is a universal inequality for $p$ points in $\mathbb R^m$. They have verified the conjecture for $p\leq3$. In this paper, we first simplify this conjecture by giving two sufficient and necessary conditions inductively. Then we prove the conjecture for the basic case $m=1$ with arbitrary $p$. In addition, for the cases when $p=4,5$ and $m\geq2$, we manage to reduce them to the basic case $m=1$ and thus prove them as well.

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