Solution of an integral equation occurring in the theories of prediction and detection

In many of the theories of prediction and detection developed during the past decade, one encounters linear integral equations which can be subsumed under the general form \int_a^b R(t, \tau) x(\tau) d\tau = f(t), a \leqq t \leqq b . This equation includes as special cases the Wiener-Hopf equation and the modified Wiener-Hopf equation \int_0^T R(\mid t - \tau \mid ) x(\tau) d\tau = f(t), 0 \leqq t \leqq T . The type of kernel considered in this note occurs when the noise can be regarded as the result of operating on white noise with a succession of not necessarily time-invariant linear differential and inverse-differential operators. For this type of noise, which is essentially a generalization of the stationary noise with a rational spectral density function, it is shown that the solution of the integral equation can be expressed in terms of solution of a certain linear differential equation with variable coefficients.

[1]  K. Karhunen Zur Spektraltheorie stochastischer prozesse , 1946 .

[2]  H. P. Thielman On a class of singular integral equations occurring in physics , 1949 .

[3]  U. Grenander Stochastic processes and statistical inference , 1950 .

[4]  H. W. Bode,et al.  A Simplified Derivation of Linear Least Square Smoothing and Prediction Theory , 1950, Proceedings of the IRE.

[5]  L. Zadeh,et al.  An Extension of Wiener's Theory of Prediction , 1950 .

[6]  D. Middleton,et al.  Statistical Errors in Measurements on Random Time Functions , 1952 .

[7]  M. Woodbury,et al.  On the relation between Green’s functions and covariances of certain stochastic processes and its application to unbiased linear prediction , 1952 .

[8]  L. A. Zadeh,et al.  Optimum Filters for the Detection of Signals in Noise , 1952, Proceedings of the IRE.

[9]  R. Davis On the Theory of Prediction of Nonstationary Stochastic Processes , 1952 .

[10]  R. Booton An Optimization Theory for Time-Varying Linear Systems with Nonstationary Statistical Inputs , 1952, Proceedings of the IRE.

[11]  G. W. Preston The Equivalence of Optimum Transducers and Sufficient and Most Efficient Statistics , 1953 .

[12]  Edward Reich,et al.  ON THE DETECTION OF A SINE WAVE IN GAUSSIAN NOISE , 1953 .

[13]  R. C. Davis The detectability of random signals in the presence of noise , 1954, Trans. IRE Prof. Group Inf. Theory.

[14]  Dante C. Youla The use of the method of maximum likelihood in estimating continuous-modulated intelligence which has been corrupted by noise , 1954, Trans. IRE Prof. Group Inf. Theory.

[15]  David S. Slepian,et al.  Estimation of signal parameters in the presence of noise , 1954, Trans. IRE Prof. Group Inf. Theory.