2015
DOI: 10.1007/s00020-015-2265-y
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Rigidity for Matrix-Valued Hardy Functions

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Cited by 5 publications
(5 citation statements)
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“…Recall the unitary part of the product ℎ ℎ from (2.10). By [15,Theorem 4.1], ℎ ℎ is rigid if and only if 2 ∩ 2 = {0}, which is the same as to say that the direct sum 2 + 2 is dense in 2 . The following fact (cf.…”
Section: Wiener's Lemma a Function In ℳ Is Invertible Therein If It mentioning
confidence: 96%
See 2 more Smart Citations
“…Recall the unitary part of the product ℎ ℎ from (2.10). By [15,Theorem 4.1], ℎ ℎ is rigid if and only if 2 ∩ 2 = {0}, which is the same as to say that the direct sum 2 + 2 is dense in 2 . The following fact (cf.…”
Section: Wiener's Lemma a Function In ℳ Is Invertible Therein If It mentioning
confidence: 96%
“…Indeed, if gL1 and gR1 lie in H-0.16em-0.16emscriptM2, then, for any function f=fLfR in H-0.16em-0.16emscriptM1 sharing with g the same unitary part, (fL*)1fR=(gL*)1gR implies c()gL1fL*=fRgR1M=()HM1*HM1,detc0,showing that f=gLkgR for k=c*c>0, as required. See Kasahara–Inoue–Pourahmadi for a general concept of scriptM‐valued rigid functions and its applications to scriptV‐valued stationary processes.…”
Section: Baxter's Theoremmentioning
confidence: 99%
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“…In fact, by [27, Theorem 3.5], (IPF) and (CND) are equivalent under (A). The condition (CND) is also closely related to the rigidity for matrix-valued Hardy functions (see [29]). It should be noticed that if {X k } satisfies (IPF), then so does the time-reversed process {X k }, and that the same holds for (M) and (CND).…”
Section: (M)mentioning
confidence: 99%
“…which goes back to Levinson-McKean [15]. See Kasahara-Inoue-Pourahmadi [14] for a general concept of M -valued rigid functions and its application to V -valued stationary processes. Let γ = (γ 1 , γ 2 , .…”
Section: Introductionmentioning
confidence: 99%