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136,605
The spectral decomposition of . . .
, 2007
"... Let π1, π2 be cuspidal automorphic representations of PGL2(R) of conductor 1 and Hecke eigenvalues λπ1,2 (n), and let h> 0 be an integer. For any smooth compactly supported weight functions W1,2: R × → C and any Y> 0 a spectral decomposition of the shifted convolution sum X λπ1 ..."
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Let π1, π2 be cuspidal automorphic representations of PGL2(R) of conductor 1 and Hecke eigenvalues λπ1,2 (n), and let h> 0 be an integer. For any smooth compactly supported weight functions W1,2: R × → C and any Y> 0 a spectral decomposition of the shifted convolution sum X λπ1
Spectral Decomposition Spectral Decomposition Associated with the spectral decomposition
, 2010
"... www.maths.anu.edu.au / ∼ alan ..."
Noncommutative Spectral Decomposition with
, 2007
"... We develop a noncommutative analogue of the spectral decomposition with the quasideterminant defined by I. Gelfand and V. Retakh. In this theory, by introducing a noncommutative Lagrange interpolating polynomial and combining a noncommutative CayleyHamilton’s theorem and an identity given by a Vand ..."
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Cited by 2 (2 self)
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We develop a noncommutative analogue of the spectral decomposition with the quasideterminant defined by I. Gelfand and V. Retakh. In this theory, by introducing a noncommutative Lagrange interpolating polynomial and combining a noncommutative CayleyHamilton’s theorem and an identity given by a
DUALITY AND ASYMPTOTIC SPECTRAL DECOMPOSITIONS
, 1986
"... Asymptotic spectral decomposition for an operator on a Banach space is studied in light of the wellknown theory of decomposable operators of Foias type. It is proved that adjoints of strongly quasidecomposable operators have the singlevalued extension property. Duality theorems for strongly decom ..."
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Asymptotic spectral decomposition for an operator on a Banach space is studied in light of the wellknown theory of decomposable operators of Foias type. It is proved that adjoints of strongly quasidecomposable operators have the singlevalued extension property. Duality theorems for strongly
THE SPECTRAL DECOMPOSITION OF THE OPTION VALUE
, 2004
"... This paper develops a spectral expansion approach to the valuation of contingent claims when the underlying state variable follows a onedimensional diffusion with the infinitesimal variance a 2 (x), drift b(x) and instantaneous discount (killing) rate r(x). The Spectral Theorem for selfadjoint ope ..."
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Cited by 23 (10 self)
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adjoint operators in Hilbert space yields the spectral decomposition of the contingent claim value function. Based on the Sturm–Liouville (SL) theory, we classify Feller’s natural boundaries into two further subcategories: nonoscillatory and oscillatory/nonoscillatory with cutoff Λ ≥ 0 (this classification
Spectral decomposition in anisotropic liquids
"... The spectral approach to the Maxwell liquids with arbitrary anisotropy is presented. It is based on the spectral decomposition of viscosity and relaxation time tensors. In this way the general structure of anisotropic viscoelasticity becomes quite transparent. Special cases of viscous and relaxation ..."
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The spectral approach to the Maxwell liquids with arbitrary anisotropy is presented. It is based on the spectral decomposition of viscosity and relaxation time tensors. In this way the general structure of anisotropic viscoelasticity becomes quite transparent. Special cases of viscous
Spectral decomposition and Baxterisation of . . .
, 2004
"... We study the geometric aspects of two exotic bialgebras S03 and S14 introduced in math.QA/0206053. These bialgebras are obtained by the FaddeevReshetikhinTakhtajan RTT prescription with nontriangular Rmatrices which are denoted R03 and R14 in the classification of Hietarinta, and they are not de ..."
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, and they are not deformations of either GL(2) or GL(1/1). We give the spectral decomposition which involves two, resp., three, projectors. These projectors are then used to provide the Baxterisation procedure with one, resp., two, parameters. Further, the projectors are used to construct the noncommutative planes together
Spectral Decomposition of Signaling Networks
"... Abstract—Many dynamical processes can be represented as directed attributed graphs or Petri nets where relationships between various entities are explicitly expressed. Signaling networks modeled as Petri nets are one class of such graphical models for representation. These networks encode how protei ..."
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on edges. Collectively, these variations are quite significant for manual and interactive analyses. Furthermore, as new information is added to these networks, the emergence of new computational models becomes more significant. From this perspective, a hierarchical spectral decomposition method is proposed
Enhancing Seismic Insight by Spectral Decomposition
"... Most geologic changes have a seismic response but sometimes this is expressed only in certain spectral ranges, buried within the broadband data. Spectral decomposition can be utilized to help interpretations for such cases. Compared with several different spectral decomposition technologies, the gen ..."
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Cited by 2 (0 self)
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Most geologic changes have a seismic response but sometimes this is expressed only in certain spectral ranges, buried within the broadband data. Spectral decomposition can be utilized to help interpretations for such cases. Compared with several different spectral decomposition technologies
Results 1  10
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136,605