an equivalent form of young's inequality with upper bound - doiSerbia
an equivalent form of young's inequality with upper bound - doiSerbia
an equivalent form of young's inequality with upper bound - doiSerbia
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216 E. Minguzzi<br />
REFERENCES<br />
1. J. B. Diaz, F. T. Metcalf: An <strong>an</strong>alytic pro<strong>of</strong> <strong>of</strong> Young’s <strong>inequality</strong>. Amer. Math.<br />
Monthly, 77 (1970), 603–609.<br />
2. G. H. Hardy, J. E. Littlewood, G. Pólya: Inequalities. Cambridge University<br />
Press, Cambridge, 1934.<br />
3. M. Merkle: A contribution to Young’s <strong>inequality</strong>. Univ. Beograd. Publ. Elektrotehn.<br />
Fak. Ser. Mat. Fiz., 461–497 (1974), 265–267.<br />
4. D. S. Mitrinović, J. E. Pečarić, A. M. Fink: Classical <strong>an</strong>d new inequalities in<br />
<strong>an</strong>alysis. Kluwer Academic Publishers, Dordrecht, 1993.<br />
5. E. Tolsted: An elementary derivation <strong>of</strong> the Cauchy, Holder, <strong>an</strong>d Minkowski inequalities<br />
from Young’s <strong>inequality</strong>. Math. Mag., 37 (1964), 2–12.<br />
Department <strong>of</strong> Applied Mathematics, (Received February 11, 2008)<br />
Florence University, Via S. Marta 3, (Revised July 26, 2008)<br />
I-50139 Florence, Italy<br />
E–mail: ettore.minguzzi@unifi.it
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