Nguyễn Thảo | Banking University of Ho Chi Minh City (original) (raw)
Address: Hanoi, Thanh Pho Ha Noi, Vietnam
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Papers by Nguyễn Thảo
Applications of Mathematics, 2013
Математические заметки, 2000
Mathematical Notes, 2000
In the present paper we construct a basis analog of the H-function of several variables with the ... more In the present paper we construct a basis analog of the H-function of several variables with the kernel depending on the products of q-gamma functions, including, for example, the H-function and the G-function of n variables. We obtain a sufficient condition for the convergence of the basis analog of the H-function of n variables, integral representations, and contiguous relations.
Fractional Calculus and Applied Analysis, 2012
We introduce an integral transform related to a Fourier sine-Fourier -Fourier cosine generalized ... more We introduce an integral transform related to a Fourier sine-Fourier -Fourier cosine generalized convolution and prove a Watson type theorem for the transform. As applications we obtain solutions of some integral equations in closed form.
Applications of Mathematics, 2013
Математические заметки, 2000
Mathematical Notes, 2000
In the present paper we construct a basis analog of the H-function of several variables with the ... more In the present paper we construct a basis analog of the H-function of several variables with the kernel depending on the products of q-gamma functions, including, for example, the H-function and the G-function of n variables. We obtain a sufficient condition for the convergence of the basis analog of the H-function of n variables, integral representations, and contiguous relations.
Fractional Calculus and Applied Analysis, 2012
We introduce an integral transform related to a Fourier sine-Fourier -Fourier cosine generalized ... more We introduce an integral transform related to a Fourier sine-Fourier -Fourier cosine generalized convolution and prove a Watson type theorem for the transform. As applications we obtain solutions of some integral equations in closed form.