Виявлення шумового сигналу в адитивній суміші на основі кумулянта другого порядку

Jazyk: ukrajinština
Rok vydání: 2021
Předmět:
Zdroj: Electronic and Acoustic Engineering; Vol. 4 No. 2 (2021); 227817-1-227817-5
Электронная и Акустическая Инженерия; Том 4 № 2 (2021); 227817-1-227817-5
Електронна та Акустична Інженерія; Том 4 № 2 (2021); 227817-1-227817-5
ISSN: 2524-2725
2617-0965
DOI: 10.20535/2617-0965.2021.4.2
Popis: In order to determine the technical condition of energetic objects with the objective of ensuring their operational reliability, durability and safety, systems of noise diagnostics, which are based on the analysis of acoustic diagnostic signals. A promising area of noise diagnostics are cumulant methods, based on cumulant analysis, which involves the use of cumulants and cumulant coefficients. In known literature no characteristics of detection of a signal within an interference-containing additive mixture with the use of a second-order cumulant (variance) can be found. That is why the objective of the paper is to study the use of cumulant method on the basis of point estimations of variance for a sample of momentary values for detection of an acoustic signal against the background of noise interference. The research was carried out by way of modeling the additive mixture of signal and interference using the MATLAB® software package. Interference is a model of a noise acoustic signal, which accompanies the operation of properly functional equipment. Signal is a model of an acoustic signal which is created with the occurrence of a malfunction. Signal and interference are independent random variables, so the property of additivity of cumulants was used – the variance of a mixture equals the sum of variances of signal and interference. The decision about the presence of a signal was made on the basis of testing two statistical hypotheses. The null hypothesis – the signal is absent, variance equals to the variance of the interference. The first hypothesis – the signal is present, variance equals to the variance of the mixture. Additional parameters: probability of a Type I error 0,01, probability of correct determination 0,99. The relative error of estimation determined the minimal sample size. These values allowed for the calculation of the threshold value, upon the exceeding of which by the variance estimation, the decision on the presence of signal is made. For each sample, assessments of variance were made. Experimental probability of correct determination is calculated as a total number of decisions taken regarding the presence of a signal, divided by the number of realizations, and corresponds to the value of the specified probability of correct determination. Its relative error was calculated in order to control the validity of the results. Also, kernel density estimation of the probability of the variance assessment for the case of a signal with normal distribution. As shown by the graphs, the assessments have a distribution that is close to normal. The conducted study proves that a variance -based cumulant method allows to detect a signal against the background of noise interference. The necessary sample size, which shows the number of the necessary momentary values, is given in the paper. That is to say that with the help of the frequency of an analogue digital converter the needed duration of the recording of a real for assessment of its variance can be obtained, and the decision on the presence or absence of a signal is to be made on the basis of the specified threshold values. The results of the study can be added to the known sample sizes and threshold values for the coefficients of asymmetry and excess with different distributions. Application of the described method requires additional testing on real acoustic signals and has the areas of use in systems of noise diagnostics.
Проведено аналіз чутливості застосування кумулянта другого порядку адитивної суміші шумового сигналу і шумової завади до виявлення сигналу. Досліджувались нормальний, рівномірний та показниковий розподіли сигналу з різними середніми квадратичними відхиленнями, для завади – стандартний нормальний розподіл. Для ймовірності правильного виявлення сигналу 0,99 при ймовірності помилки першого роду 0,01 розраховано порогові значення та мінімальні об’єми вибірки, які забезпечують задані ймовірності, виходячи з гауссівського розподілу оцінки кумулянта другого порядку. Результати моделювання підтвердили розрахунки, експериментальна ймовірність правильного виявлення отримана не менше заданої.
Databáze: OpenAIRE