• Title/Summary/Keyword: Parseval′s relation

Search Result 6, Processing Time 0.019 seconds

FOURIER-YEH-FEYNMAN TRANSFORM AND CONVOLUTION ON YEH-WIENER SPACE

  • Kim, Byoung Soo;Yang, Young Kyun
    • Korean Journal of Mathematics
    • /
    • v.16 no.3
    • /
    • pp.335-348
    • /
    • 2008
  • We define Fourier-Yeh-Feynman transform and convolution product on the Yeh-Wiener space, and establish the existence of Fourier-Yeh-Feynman transform and convolution product for functionals in a Banach algebra $\mathcal{S}(Q)$. Also we obtain Parseval's relation for those functionals.

  • PDF

INTEGRATION FORMULAS INVOLVING FOURIER-FEYNMAN TRANSFORMS VIA A FUBINI THEOREM

  • Huffman, Timothy;Skoug, David;Storvick, David
    • Journal of the Korean Mathematical Society
    • /
    • v.38 no.2
    • /
    • pp.421-435
    • /
    • 2001
  • In this paper we use a general Fubini theorem established in [13] to obtain several Feynman integration formulas involving analytic Fourier-Feynman transforms. Included in these formulas is a general Parseval's relation.

  • PDF

GENERALIZED SEQUENTIAL CONVOLUTION PRODUCT FOR THE GENERALIZED SEQUENTIAL FOURIER-FEYNMAN TRANSFORM

  • Kim, Byoung Soo;Yoo, Il
    • Korean Journal of Mathematics
    • /
    • v.29 no.2
    • /
    • pp.321-332
    • /
    • 2021
  • This paper is a further development of the recent results by the authors on the generalized sequential Fourier-Feynman transform for functionals in a Banach algebra Ŝ and some related functionals. We investigate various relationships between the generalized sequential Fourier-Feynman transform and the generalized sequential convolution product of functionals. Parseval's relation for the generalized sequential Fourier-Feynman transform is also given.

FOURIER SERIES OF A STOCHASTIC PROCESS $X(t,\omega) \in L^2_{s.a.p.}$

  • Choo, Jong-Mi
    • Bulletin of the Korean Mathematical Society
    • /
    • v.21 no.2
    • /
    • pp.127-135
    • /
    • 1984
  • In this paper, we find the Fourier series of X(t, .omega.).mem. $L^{2}$$_{s.a.p.}$ and the Parseval relation of X(t, .omega.).mem. $L^{2}$$_{s.a.p.}$. In section 2, we investigate some basic properties of X(t, .omega.).mem. $L^{2}$$_{s.a.p.}$ In section 3, we show that the mean of X(t, .omega.).mem. $L^{2}$$_{s.a.p.}$ exists and in section 4, after showing the existence of Fourier exponents and Fourier coefficients of X(t, .omega.).mem. $L^{2}$$_{s.a.p.}$. we give the Parseval relation of X(t, .omega.).mem. $L^{2}$$_{s.a.p.}$. For convenience we will denote X(t, .omega.) as X(t) in what follows.hat follows.

  • PDF

INTEGRAL TRANSFORMS OF FUNCTIONALS ON A FUNCTION SPACE OF TWO VARIABLES

  • Kim, Bong Jin;Kim, Byoung Soo;Yoo, Il
    • Journal of the Chungcheong Mathematical Society
    • /
    • v.23 no.2
    • /
    • pp.349-362
    • /
    • 2010
  • We establish the various relationships among the integral transform ${\mathcal{F}}_{{\alpha},{\beta}}F$, the convolution product $(F*G)_{\alpha}$ and the first variation ${\delta}F$ for a class of functionals defined on K(Q), the space of complex-valued continuous functions on $Q=[0,S]{\times}[0,T]$ which satisfy x(s, 0) = x(0, t) = 0 for all $(s,t){\in}Q$. And also we obtain Parseval's and Plancherel's relations for the integral transform of some functionals defined on K(Q).

A Study on the Computation of Digital Filter Frequency characteristics Based on a Difference Equation (차분방정식에 기초를 둔 디지털 필터의 주파수 특성 계산에 관한 연구)

  • 박인정;이태원
    • Journal of the Korean Institute of Telematics and Electronics
    • /
    • v.22 no.3
    • /
    • pp.23-30
    • /
    • 1985
  • When a digital filter implementation is based on a difference equation, the frequency characteristics cannot be obtained by direct computation, but be obtained by experiment or analogized by Z-transform. In this paper, the method to compute the frequency magnitude response of the function expressed in a difference equation is derived from PARSEVAL's relation. To verify the validity of this new method two types of digital filters are implemented. Both filters' characteristics are measured and their values are compared with the value obtained by a Z-transform and with the value by a difference equation. The result shows that the measured values and the values obtained by the difference equaton are more closer than the values by a Z-transform. And the difference-equaton-based filters' showed sharper roll off characteristics than the Z-transform-based filters. Therefore when a digital filter implementation is based on a difference equation, the characteristics computation by a difference equation predicts better practical results than based on Z-transform.

  • PDF