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Stock exchange fractional dynamics defined as fractional exponential growth driven by (usual) Gaussian white noise. Application to fractional Black-Scholes equations - MaRDI portal

Stock exchange fractional dynamics defined as fractional exponential growth driven by (usual) Gaussian white noise. Application to fractional Black-Scholes equations (Q939363)

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scientific article; zbMATH DE number 5315281
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English
Stock exchange fractional dynamics defined as fractional exponential growth driven by (usual) Gaussian white noise. Application to fractional Black-Scholes equations
scientific article; zbMATH DE number 5315281

    Statements

    title
    Stock exchange fractional dynamics defined as fractional exponential growth driven by (usual) Gaussian white noise. Application to fractional Black-Scholes equations (English)
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    publication date
    22 August 2008
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    zbMATH Keywords
    fractional Gaussian noises
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    fractional stochastic differential equation
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    fractional exponential growth
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    fractional Brownian motion
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    path probability density
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    fractional Black-Scholes equation
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    author
    Guy Jumarie
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    cites work
    Q5551649
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    Identifiers

    zbMATH DE Number
    5315281
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    OpenAlex ID
    W1965277094
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