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• Muckenhoupt_weights abstract "In mathematics, the class of Muckenhoupt weights Ap consists of those weights ω for which the Hardy–Littlewood maximal operator is bounded on Lp(dω). Specifically, we consider functions f on Rn and their associated maximal functions M( f ) defined aswhere Br(x) is the ball in Rn with radius r and centre x. Let 1 ≤ p < ∞, we wish to characterise the functions ω : Rn → [0, ∞) for which we have a boundwhere C depends only on p and ω. This was first done by Benjamin Muckenhoupt.".
• Muckenhoupt_weights wikiPageID "16358346".
• Muckenhoupt_weights wikiPageRevisionID "601002926".
• Muckenhoupt_weights hasPhotoCollection Muckenhoupt_weights.
• Muckenhoupt_weights subject Category:Harmonic_analysis.
• Muckenhoupt_weights subject Category:Real_analysis.
• Muckenhoupt_weights comment "In mathematics, the class of Muckenhoupt weights Ap consists of those weights ω for which the Hardy–Littlewood maximal operator is bounded on Lp(dω). Specifically, we consider functions f on Rn and their associated maximal functions M( f ) defined aswhere Br(x) is the ball in Rn with radius r and centre x. Let 1 ≤ p < ∞, we wish to characterise the functions ω : Rn → [0, ∞) for which we have a boundwhere C depends only on p and ω. This was first done by Benjamin Muckenhoupt.".
• Muckenhoupt_weights label "Muckenhoupt weights".
• Muckenhoupt_weights sameAs m.03whqmk.
• Muckenhoupt_weights sameAs Q6931165.
• Muckenhoupt_weights sameAs Q6931165.
• Muckenhoupt_weights wasDerivedFrom Muckenhoupt_weights?oldid=601002926.
• Muckenhoupt_weights isPrimaryTopicOf Muckenhoupt_weights.