Christ–Kiselev maximal inequality mathematics , the Christ–Kiselev maximal inequality is a maximal inequality for filtrations , named for mathematicians Michael Christ and Alexander Kiselev .A continuous filtration of is a family of measurable sets such that,, and for all bounded linear operator for finite . Define the Christ–Kiselev maximal function bounded operator , andLet, and suppose is a bounded linear operator for finite. Define, for,operator .constructing .Applications The Christ–Kiselev maximal inequality has applications to the Fourier transform and convergence of Fourier series , as well as to the study of Schrödinger operators .
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