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  1. www.ams.org › journals › bullAnalytic number theory - American Mathematical Society

    2006年2月17日 · BULLETIN (New Series) OF THE AMERICAN MATHEMATICAL SOCIETY Volume 43, Number 2, Pages 273–278 S 0273-0979(06)01084-6 Article electronically published on February 17, 2006 Analytic number theory, by Henryk Iwaniec and Emmanuel Kowalski, Colloquium

  2. www.ams.org › journals › procON PRINCIPAL EIGENVALUES FOR BOUNDARY VALUE PROBLEMS WITH ...

    PROCEEDINGS OF THE AMERICAN MATHEMATICAL SOCIETY Volume 127, Number 1, January 1999, Pages 125{130 S 0002-9939(99)04561-X ON PRINCIPAL EIGENVALUES FOR BOUNDARY VALUE PROBLEMS WITH INDEFINITE WEIGHT AND ROBIN

  3. www.ams.org › publications › authorsAMS :: Iwaniec and Kowalski: Analytic Number Theory

    This page is maintained by the authors. Contact information: Henryk Iwaniec Department of Mathematics Rutgers University 110 Frelinghuysen Road Piscataway, NJ 08854 Email: Henryk Iwaniec Emmanuel Kowalski Mathematics and Information University of

  4. www.ams.org › journals › procNEUMANN EIGENVALUE ESTIMATE ON A COMPACT RIEMANNIAN MANIFOLD ...

    PROCEEDINGS OF THE AMERICAN MATHEMATICAL SOCIETY Volume 108, Number 4, April 1990. NEUMANN EIGENVALUE ESTIMATE. ON A COMPACT RIEMANNIAN MANIFOLD. ROGER CHEN. (Communicated by Jonathan M. Rosenberg) Abstract. In their article, P. Li and S. T. Yau give a lower bound of the first Neumann eigenvalue in terms of geometrical invariants for a compact ...

  5. www.ams.org › journals › bullBourgain’s work in Fourier restriction - American ...

    2021年1月27日 · Bourgain’s arrival on the scene was like thunder, with the two landmark papers [23] and [22] completely revolutionizing the field. The first paper introduced a whole new toolbox in Fourier restriction. Here are a few examples. 3 First, he proved that Kakeya sets in have dimension at least 7 3.

  6. www.ams.org › journals › tranINEQUALITIES FOR EIGENVALUES OF A CLAMPED PLATE PROBLEM - ...

    2005年10月31日 · INEQUALITIES FOR EIGENVALUES OF A CLAMPED PLATE PROBLEM. TRANSACTIONS OF THE AMERICAN MATHEMATICAL SOCIETY Volume 358, Number 6, Pages 2625–2635 S 0002-9947(05)04023-7 Article electronically published on October 31, 2005. INEQUALITIES FOR EIGENVALUES OF A CLAMPED PLATE PROBLEM. QING-MING CHENG AND HONGCANG YANG Abstract.

  7. www.ams.org › journals › tranFractional Sobolev extension and imbedding - American ...

    2014年6月30日 · and hence give (1.3). We should point out that the idea to derive the measure density property from the imbedding was originally invented by Hajlasz, Koskela and Tuoninen [13] for Sobolev W1,p-extension domains with ). Here we adapt their arguments to the setting of the fractional Sobolev. p [1, ∈ ∞ Ws,p-extension.