### Выдержка

An analytical signal represented as a symmetrical peak or a corresponding integral curve (wave) was described using three elementary functions: Gaussian function, derivative of a logistic function, and Cauchy function. The shape and geometric properties of such an analytic peak were characterized by a triangular frame formed by the tangents at the inflection points and the asymptotes to peak branches. In the case of a wave, a frame formed by the tangent at the inflection point of the wave and the asymptotes to its lower and upper branches was used for the same purpose. The use of the shape of differential curves as increments for physicochemical calculations was discussed.

Язык оригинала | Английский |
---|---|

Страницы (с-по) | 615-625 |

Число страниц | 11 |

Журнал | Journal of Analytical Chemistry |

Том | 55 |

Номер выпуска | 7 |

Состояние | Опубликовано - 2000 |

### Отпечаток

### ASJC Scopus subject areas

- Analytical Chemistry

### Цитировать

*Journal of Analytical Chemistry*,

*55*(7), 615-625.

**Systematic study of elementary models of analytical signals in the form of peaks and waves.** / Stromberg, A. G.; Romanenko, S. V.; Romanenko, E. S.

Результат исследований: Материалы для журнала › Статья

*Journal of Analytical Chemistry*, том. 55, № 7, стр. 615-625.

}

TY - JOUR

T1 - Systematic study of elementary models of analytical signals in the form of peaks and waves

AU - Stromberg, A. G.

AU - Romanenko, S. V.

AU - Romanenko, E. S.

PY - 2000

Y1 - 2000

N2 - An analytical signal represented as a symmetrical peak or a corresponding integral curve (wave) was described using three elementary functions: Gaussian function, derivative of a logistic function, and Cauchy function. The shape and geometric properties of such an analytic peak were characterized by a triangular frame formed by the tangents at the inflection points and the asymptotes to peak branches. In the case of a wave, a frame formed by the tangent at the inflection point of the wave and the asymptotes to its lower and upper branches was used for the same purpose. The use of the shape of differential curves as increments for physicochemical calculations was discussed.

AB - An analytical signal represented as a symmetrical peak or a corresponding integral curve (wave) was described using three elementary functions: Gaussian function, derivative of a logistic function, and Cauchy function. The shape and geometric properties of such an analytic peak were characterized by a triangular frame formed by the tangents at the inflection points and the asymptotes to peak branches. In the case of a wave, a frame formed by the tangent at the inflection point of the wave and the asymptotes to its lower and upper branches was used for the same purpose. The use of the shape of differential curves as increments for physicochemical calculations was discussed.

UR - http://www.scopus.com/inward/record.url?scp=0033819190&partnerID=8YFLogxK

UR - http://www.scopus.com/inward/citedby.url?scp=0033819190&partnerID=8YFLogxK

M3 - Article

AN - SCOPUS:0033819190

VL - 55

SP - 615

EP - 625

JO - Journal of Analytical Chemistry

JF - Journal of Analytical Chemistry

SN - 1061-9348

IS - 7

ER -