The Theory of Vector Valued Fourier Hyperfunctions of Mixed Type, II
The soft resolution (3: )» d) of the sheaf Ok,i of slowly increasing holomorphic functions of (&,/) type is constructed so that the section modules £F(o,p)(£) are Frechet nuclear spaces. Using the above resolution, we construct the mixed type Fourier hyperfunctions which take their values in Frechet spaces.
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Image representation of the acoustic signal: An effective tool for modeling spectral and temporal dynamics of connected speech. [PDF]
Ghasemzadeh H, Doyle PC, Searl J.
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Jia M +6 more
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Development and Validation of a Single-Variable Comparison Stimulus for Matching Strained Voice Quality Using a Psychoacoustic Framework. [PDF]
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KCNJ15 deficiency promotes drug resistance via affecting the function of lysosomes. [PDF]
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Theory of General Fourier Hyperfunctions
In this article, we construct, by the duality method, the theory of general Fourier hyperfunctions valued in a locally convex topological vector space, which is not necessarily a Frechet space. We realize, by the duality method, general Fourier analytic-linear mappings and general Fourier hyperfunctions.
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On the structure of Fourier hyperfunctions
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Body Acoustics for the Non-Invasive Diagnosis of Medical Conditions. [PDF]
Cook J, Umar M, Khalili F, Taebi A.
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Kernel Theorem for Fourier Hyperfunctions
An appropriate general version of the kernel theorem of L. Schwartz is formulated for Fourier hyperfunctions and a direct functional analytic proof is presented.
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