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[521] Concordance and the harmonic analysis of sequences

A. P. Guinand Edmonton, Canada

TBD mathscidoc:1701.331175

Acta Mathematica, 101, (3), 235-271, 1959.6

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[522] On the theory of interpolation

G. Grünwald Budapest

TBD mathscidoc:1701.33934

Acta Mathematica, 75, (1), 219-245, 1942.12

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[523] Uniform approximation on smooth curves

Gabriel Stolzenberg Brown University, Providence, R. I., USA

TBD mathscidoc:1701.331300

Acta Mathematica, 115, (1), 185-198, 1965.7

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[524] $L$^{$p$}Carleman inequalities and uniqueness of solutions of nonlinear Schrödinger equations

Alexandru D. Ionescu Department of Mathematics, University of Wisconsin-Madison Carlos E. Kenig Department of Mathematics, University of Chicago

TBD mathscidoc:1701.331949

Acta Mathematica, 193, (2), 193-239, 2003.11

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[525] Determining the absolutely continuous component of a probability distribution from its Fourier-Stieltjes transform

H. Robert van der Vaart Institute of Statistics (Biomathematics Program) and Department of Mathematics, North Carolina State University at Raleigh

TBD mathscidoc:1701.332282

Arkiv for Matematik, 7, (4), 331-342, 1968.7

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TBD

[521] Concordance and the harmonic analysis of sequences

A. P. Guinand Edmonton, Canada

TBD mathscidoc:1701.331175

[522] On the theory of interpolation

G. Grünwald Budapest

TBD mathscidoc:1701.33934

[523] Uniform approximation on smooth curves

Gabriel Stolzenberg Brown University, Providence, R. I., USA

TBD mathscidoc:1701.331300

[524] $L$^{$p$}Carleman inequalities and uniqueness of solutions of nonlinear Schrödinger equations

Alexandru D. Ionescu Department of Mathematics, University of Wisconsin-Madison Carlos E. Kenig Department of Mathematics, University of Chicago

TBD mathscidoc:1701.331949

[525] Determining the absolutely continuous component of a probability distribution from its Fourier-Stieltjes transform

H. Robert van der Vaart Institute of Statistics (Biomathematics Program) and Department of Mathematics, North Carolina State University at Raleigh

TBD mathscidoc:1701.332282

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