In this note we provide an elementary characterization of the functions satisfying a reverse Holder inequality with increasing supports in the sense of Giaquinta and Modica (in J. Reine Angew. Math. 311/312 ( 1979), 145-169). The result involves a variant of the usual A(infinity) weights conditions which holds true also for nondoubling measures. From this equivalence we derive a simple "compactness-driven" higher integrability criterion
We discuss several characterizations of the A∞ class of weights in the setting of general bases. Alt...
In this article we present a new proof of a sharp Reverse Hölder Inequality for A∞ weights. Then we ...
We prove that for any weight ϕ defined on [0,1]n that satisfies a reverse Holder inequality with exp...
Abstract. We present a new short proof for the classical Gehring lemma on higher integra-bility in t...
In 1972, B. Muckenhoupt [Trans. Amer. Math. Soc. {bf 165} (1972), 207--226; [msn] MR0293384 [/msn]] ...
We present dimension-free reverse Hölder inequalities for strong $A^{\ast}_p$ weights, $1 \le p < \i...
We give higher integrability results for classes of functions satisfyng general reverse Holder inequ...
We prove that Muckenhoupt's $\Cal A_1$-weights satisfy a reverse Hölder inequality with an explicit ...
Funding Information: E.-K. Kurki has been funded by a young researcher’s grant from the Emil Aaltone...
We prove that Muckenhoupt’s A1-weights satisfy a reverse Hõlder inequality with an explicit and asy...
We present dimension-free reverse H¨older inequalities for strong A∗p weights, 1 ≤ p < ∞. We also pr...
We give characterizations of weights for which reverse inequalities of theH¨oldertype for monotone f...
A weight is a nonnegative, locally integrable function. Muckenhoupt weights are an important class o...
In this note we show that p-admissible measures in one dimension (i.e. doubling measures admitting a...
In the Euclidean setting, the Fujii-Wilson-type A(infinity) weights satisfy a reverse Holder inequal...
We discuss several characterizations of the A∞ class of weights in the setting of general bases. Alt...
In this article we present a new proof of a sharp Reverse Hölder Inequality for A∞ weights. Then we ...
We prove that for any weight ϕ defined on [0,1]n that satisfies a reverse Holder inequality with exp...
Abstract. We present a new short proof for the classical Gehring lemma on higher integra-bility in t...
In 1972, B. Muckenhoupt [Trans. Amer. Math. Soc. {bf 165} (1972), 207--226; [msn] MR0293384 [/msn]] ...
We present dimension-free reverse Hölder inequalities for strong $A^{\ast}_p$ weights, $1 \le p < \i...
We give higher integrability results for classes of functions satisfyng general reverse Holder inequ...
We prove that Muckenhoupt's $\Cal A_1$-weights satisfy a reverse Hölder inequality with an explicit ...
Funding Information: E.-K. Kurki has been funded by a young researcher’s grant from the Emil Aaltone...
We prove that Muckenhoupt’s A1-weights satisfy a reverse Hõlder inequality with an explicit and asy...
We present dimension-free reverse H¨older inequalities for strong A∗p weights, 1 ≤ p < ∞. We also pr...
We give characterizations of weights for which reverse inequalities of theH¨oldertype for monotone f...
A weight is a nonnegative, locally integrable function. Muckenhoupt weights are an important class o...
In this note we show that p-admissible measures in one dimension (i.e. doubling measures admitting a...
In the Euclidean setting, the Fujii-Wilson-type A(infinity) weights satisfy a reverse Holder inequal...
We discuss several characterizations of the A∞ class of weights in the setting of general bases. Alt...
In this article we present a new proof of a sharp Reverse Hölder Inequality for A∞ weights. Then we ...
We prove that for any weight ϕ defined on [0,1]n that satisfies a reverse Holder inequality with exp...
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