Man-Kyu Im scite author profile

Man-Kyu Im

5Publications

25Citation Statements Received

22Citation Statements Given

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Hannam University

Publications

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Relations Among the First Variation, the Convolutions and the Generalized Fourier-Gauss Transforms

Im¹,

Ji²,

Park³

2011

Bulletin of the Korean Mathematical Society

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Abstract. We first study the generalized Fourier-Gauss transforms of functionals defined on the complexification B C of an abstract Wiener space (H, B, ν). Secondly, we introduce a new class of convolution products of functionals defined on B C and study several properties of the convolutions. Then we study various relations among the first variation, the convolutions, and the generalized Fourier-Gauss transforms.

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A measure-valued analogue of Wiener measure and the measure-valued Feynman-Kac formula

Ryu¹,

Im²

2002

Trans. Amer. Math. Soc.

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Abstract. In this article, we consider a complex-valued and a measure-valued measure on C [0, t], the space of all real-valued continuous functions on [0, t]. Using these concepts, we establish the measure-valued Feynman-Kac formula and we prove that this formula satisfies a Volterra integral equation. The work here is patterned to some extent on earlier works by Kluvanek in 1983 and by Lapidus in 1987, but the present setting requires a number of new concepts and results.

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The Measure-Valued Dyson Series and Its Stability Theorem

Ryu¹,

Im²

2006

Journal of the Korean Mathematical Society

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THE BARTLE INTEGRAL AND THE CONDITIONAL WIENER INTEGRAL ON C[0,t]

Ryu¹,

Im²

2004

Communications of the Korean Mathematical Society

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Generalized Conditional Fourier-Wiener Transform and Convolution Product

Im¹

2015

FJMS

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Man-Kyu Im

Relations Among the First Variation, the Convolutions and the Generalized Fourier-Gauss Transforms

A measure-valued analogue of Wiener measure and the measure-valued Feynman-Kac formula

The Measure-Valued Dyson Series and Its Stability Theorem

THE BARTLE INTEGRAL AND THE CONDITIONAL WIENER INTEGRAL ON C[0,t]

Generalized Conditional Fourier-Wiener Transform and Convolution Product

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