Abstract
Born–Jordan operators are a class of pseudodifferential operators arising as a generalization of the quantization rule for polynomials on the phase space introduced by Born and Jordan in 1925. The weak definition of such operators involves the Born–Jordan distribution, first introduced by Cohen in 1966 as a member of the Cohen class. We perform a time-frequency analysis of the Cohen kernel of the Born–Jordan distribution, using modulation and Wiener amalgam spaces. We then provide sufficient and necessary conditions for Born–Jordan operators to be bounded on modulation spaces. We use modulation spaces as appropriate symbols classes.
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