Results 181 to 190 of about 8,363 (221)
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1992
Our aim is to construct hyperfunctions so that they have as close a relation as possible to ordinary functions. Of the operations of addition, subtraction, multiplication and division, the first two are, of course, possible as linear combinations. There are, however, problems with multiplication and division.
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Our aim is to construct hyperfunctions so that they have as close a relation as possible to ordinary functions. Of the operations of addition, subtraction, multiplication and division, the first two are, of course, possible as linear combinations. There are, however, problems with multiplication and division.
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The Hyperfunctioning Thyroid Nodule
Southern Medical Journal, 1969W M, Morton, J W, Runyan
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1992
Let us begin with two ordinary functions φ 1(x) and φ 2(x) and suppose that their Fourier transforms $${\psi _1}(\xi ) = F{\phi _1}(x),{\psi _2}(\xi ) = F{\phi _2}(x)$$ (1.1) exist. The Fourier transform of the product φ 1(x) · φ 2(x) is $$F\{ {\phi _1}(x){\phi _2}(x)\} = {\text{ }}\int_{ - \infty }^\infty {{\phi _1}(x){\phi _2}(x){e ...
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Let us begin with two ordinary functions φ 1(x) and φ 2(x) and suppose that their Fourier transforms $${\psi _1}(\xi ) = F{\phi _1}(x),{\psi _2}(\xi ) = F{\phi _2}(x)$$ (1.1) exist. The Fourier transform of the product φ 1(x) · φ 2(x) is $$F\{ {\phi _1}(x){\phi _2}(x)\} = {\text{ }}\int_{ - \infty }^\infty {{\phi _1}(x){\phi _2}(x){e ...
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HYPERFUNCTIONING PARATHYROID CARCINOMA
Medical Journal of Australia, 1968N C, Newton, M G, Sumich
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Hyperfunctioning Adrenocortical Diseases
Medical Clinics of North America, 1967openaire +2 more sources

