Abstract
We present an elementary proof of two a priori estimates for Schrödinger type multipliers on the circle. The first is an $L^4 - L^2$ inequality of Bourgain, while the second is a new $L^6 - L^{3/2}$ inequality. Estimates of this type are useful for the study of the Cauchy problem for Schr\"odinger type equations. The proofs are based on a counting argument and standard real and harmonic analysis techniques.
Citation
A. Alexandrou Himonas. Gerard Misiolek. "A priori estimates for Schrödinger type multipliers." Illinois J. Math. 45 (2) 631 - 640, Summer 2001. https://doi.org/10.1215/ijm/1258138360
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