2009
DOI: 10.1016/j.jfa.2009.09.014
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Lebesgue type decompositions for nonnegative forms

Abstract: A nonnegative form t on a complex linear space is decomposed with respect to another nonnegative form w: it has a Lebesgue decomposition into an almost dominated form and a singular form. The part which is almost dominated is the largest form majorized by t which is almost dominated by w. The construction of the Lebesgue decomposition only involves notions from the complex linear space. An important ingredient in the construction is the new concept of the parallel sum of forms. By means of Hilbert space techni… Show more

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Cited by 57 publications
(143 citation statements)
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“…However, these authors dealt with positive quadratic forms (in the algebraic sense) with a common domain. The study in [5] and subsequent related works (see [13] for instance) might be related to ours, but the exact relationship is not clear to the author. When a, b are bounded, the following expression (for the quadratic form corresponding to the parallel sum a : b) is well-known:…”
Section: Introductionmentioning
confidence: 77%
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“…However, these authors dealt with positive quadratic forms (in the algebraic sense) with a common domain. The study in [5] and subsequent related works (see [13] for instance) might be related to ours, but the exact relationship is not clear to the author. When a, b are bounded, the following expression (for the quadratic form corresponding to the parallel sum a : b) is well-known:…”
Section: Introductionmentioning
confidence: 77%
“…In fact, by including unbounded operators, we can make the whole theory much more transparent. In [5] parallel sums for (unbounded) positive quadratic forms were studied. However, these authors dealt with positive quadratic forms (in the algebraic sense) with a common domain.…”
Section: Introductionmentioning
confidence: 99%
“…The underlying idea behind the present approach is that the pair of forms induces a linear relation between the Hilbert spaces generated by the forms, which makes it possible to apply the range characterization appearing in the first part of the paper. As was shown in [13] the parallel sum and difference of forms play an essential role in the Lebesgue type decomposition of one form with respect to another form.…”
Section: Introductionmentioning
confidence: 91%
“…The parallel sum t : w of nonnegative forms t and w was introduced in [13], where the main properties of t : w can be found. From Theorem 5.2 one obtains the following result for parallel sums.…”
Section: Parallel Sums and Parallel Differences For Formsmentioning
confidence: 99%
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