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Panek, Dariusz:
On Sharp Extrapolation Theorems - Weighted theory and sharp bounds - Taschenbuch
2010, ISBN: 9783838388175
[ED: Taschenbuch / Paperback], [PU: LAP Lambert Academic Publishing], Extrapolation is one of the most signi cant and powerful properties of the weighted theory. It basically states that … Mehr…
[ED: Taschenbuch / Paperback], [PU: LAP Lambert Academic Publishing], Extrapolation is one of the most signi cant and powerful properties of the weighted theory. It basically states that an estimate on a weighted Lpo space for a single exponent po 1 and all weights in the Muckenhoupt class Apo implies a corresponding Lp estimate for all p, 1 p , and all weights in Ap . Sharp Extrapolation Theorems track down the dependence on the Ap characteristic of the weight. In this dissertation we generalize the Sharp xtrapolation Theorem to the case where the underlying measure is d = uo dx, and uo is an A weight. We also use it to extend Lerner's extrapolation techniques. Such Theorems can then be used to extrapolate some known initial weighted estimates in L2 (wd ). In addition, for some operators this approach allows us to specify the weights w 1 = uo and to use known weighted results in Lp (wd ) to obtain some estimates on the unweighted space. This work was inspired by the paper [Per1] where the L2 weighted estimates for the dyadic square function were considered to obtain the sharp estimates for the so-called Haar Multiplier in L2., DE, [SC: 0.00], Neuware, gewerbliches Angebot, 88, Selbstabholung und Barzahlung, PayPal, Offene Rechnung, Banküberweisung, Internationaler Versand<
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Dariusz Panek:
On Sharp Extrapolation Theorems - Taschenbuch
ISBN: 9783838388175
[ED: Taschenbuch], [PU: LAP Lambert Academic Publishing], Neuware - Extrapolation is one of the most signi cant and powerful properties of the weighted theory. It basically states that an… Mehr…
[ED: Taschenbuch], [PU: LAP Lambert Academic Publishing], Neuware - Extrapolation is one of the most signi cant and powerful properties of the weighted theory. It basically states that an estimate on a weighted Lpo space for a single exponent po 1 and all weights in the Muckenhoupt class Apo implies a corresponding Lp estimate for all p, 1 p , and all weights in Ap . Sharp Extrapolation Theorems track down the dependence on the Ap characteristic of the weight. In this dissertation we generalize the Sharp xtrapolation Theorem to the case where the underlying measure is d = uo dx, and uo is an A weight. We also use it to extend Lerner's extrapolation techniques. Such Theorems can then be used to extrapolate some known initial weighted estimates in L2 (wd ). In addition, for some operators this approach allows us to specify the weights w 1 = uo and to use known weighted results in Lp (wd ) to obtain some estimates on the unweighted space. This work was inspired by the paper [Per1] where the L2 weighted estimates for the dyadic square function were considered to obtain the sharp estimates for the so-called Haar Multiplier in L2., DE, [SC: 2.00], Neuware, gewerbliches Angebot, 220x150x5 mm, 88, PayPal, Offene Rechnung, Banküberweisung, Sofortüberweisung, Internationaler Versand<
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On Sharp Extrapolation Theorems Dariusz Panek Author - neues Buch
ISBN: 9783838388175
Extrapolation is one of the most significant and powerful properties of the weighted theory. It basically states that an estimate on a weighted Lpo space for a single exponent po … Mehr…
Extrapolation is one of the most significant and powerful properties of the weighted theory. It basically states that an estimate on a weighted Lpo space for a single exponent po ≥ 1 and all weights in the Muckenhoupt class Apo implies a corresponding Lp estimate for all p, 1 < p < ∞, and all weights in Ap . Sharp Extrapolation Theorems track down the dependence on the Ap characteristic of the weight. In this dissertation we generalize the Sharp xtrapolation Theorem to the case where the underlying measure is dσ = uo dx, and uo is an A∞ weight. We also use it to extend Lerner's extrapolation techniques. Such Theorems can then be used to extrapolate some known initial weighted estimates in L2 (wdσ ). In addition, for some operators this approach allows us to specify the weights w−1 = uo and to use known weighted results in Lp (wdσ ) to obtain some estimates on the unweighted space. This work was inspired by the paper [Per1] where the L2 weighted estimates for the dyadic square function were considered to obtain the sharp estimates for the so-called Haar Multiplier in L2. New Textbooks>Trade Paperback>Science>Mathematics>Mathematics, LAP Lambert Academic Publishing Core >1 >T<
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Dariusz Panek:
On Sharp Extrapolation Theorems : Weighted theory and sharp bounds - Taschenbuch
2010, ISBN: 3838388178
[EAN: 9783838388175], Neubuch, [PU: LAP Lambert Acad. Publ. Aug 2010], This item is printed on demand - Print on Demand Neuware - Extrapolation is one of the most signi cant and powerful … Mehr…
[EAN: 9783838388175], Neubuch, [PU: LAP Lambert Acad. Publ. Aug 2010], This item is printed on demand - Print on Demand Neuware - Extrapolation is one of the most signi cant and powerful properties of the weighted theory. It basically states that an estimate on a weighted Lpo space for a single exponent po 1 and all weights in the Muckenhoupt class Apo implies a corresponding Lp estimate for all p, 1 p , and all weights in Ap . Sharp Extrapolation Theorems track down the dependence on the Ap characteristic of the weight. In this dissertation we generalize the Sharp xtrapolation Theorem to the case where the underlying measure is d = uo dx, and uo is an A weight. We also use it to extend Lerner's extrapolation techniques. Such Theorems can then be used to extrapolate some known initial weighted estimates in L2 (wd ). In addition, for some operators this approach allows us to specify the weights w 1 = uo and to use known weighted results in Lp (wd ) to obtain some estimates on the unweighted space. This work was inspired by the paper [Per1] where the L2 weighted estimates for the dyadic square function were considered to obtain the sharp estimates for the so-called Haar Multiplier in L2. 88 pp. Englisch<
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(*) Derzeit vergriffen bedeutet, dass dieser Titel momentan auf keiner der angeschlossenen Plattform verfügbar ist.
On Sharp Extrapolation Theorems - neues Buch
ISBN: 9783838388175
Extrapolation is one of the most signi cant and powerful properties of the weighted theory. It basically states that an estimate on a weighted Lpo space for a single exponent po 1 and all… Mehr…
Extrapolation is one of the most signi cant and powerful properties of the weighted theory. It basically states that an estimate on a weighted Lpo space for a single exponent po 1 and all weights in the Muckenhoupt class Apo implies a corresponding Lp estimate for all p, 1 p , and all weights in Ap . Sharp Extrapolation Theorems track down the dependence on the Ap characteristic of the weight. In this dissertation we generalize the Sharp xtrapolation Theorem to the case where the underlying measure is d = uo dx, and uo is an A weight. We also use it to extend Lerner's extrapolation techniques. Such Theorems can then be used to extrapolate some known initial weighted estimates in L2 (wd ). In addition, for some operators this approach allows us to specify the weights w 1 = uo and to use known weighted results in Lp (wd ) to obtain some estimates on the unweighted space. This work was inspired by the paper [Per1] where the L2 weighted estimates for the dyadic square function were considered to obtain the sharp estimates for the so-called Haar Multiplier in L2. Bücher, Hörbücher & Kalender / Bücher / Sachbuch / Naturwissenschaften / Mathematik<
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