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Recurrent Relationships in Separation Science. / Zenkevich, Igor ; Komsta, Łukasz ; Heyden, Yvan Vander ; Sherma, Joseph .

Chemometrics in Chromatography. ред. / I. Komsta; Y. van Heyden; J. Sherma. 1st Edition. ред. New York : Taylor & Francis, 2017. стр. 449-468.

Результаты исследований: Публикации в книгах, отчётах, сборниках, трудах конференцийстатья в сборникенаучнаяРецензирование

Harvard

Zenkevich, I, Komsta, Ł, Heyden, YV & Sherma, J 2017, Recurrent Relationships in Separation Science. в I Komsta, Y van Heyden & J Sherma (ред.), Chemometrics in Chromatography. 1st Edition изд., Taylor & Francis, New York, стр. 449-468.

APA

Zenkevich, I., Komsta, Ł., Heyden, Y. V., & Sherma, J. (2017). Recurrent Relationships in Separation Science. в I. Komsta, Y. van Heyden, & J. Sherma (Ред.), Chemometrics in Chromatography (1st Edition ред., стр. 449-468). Taylor & Francis.

Vancouver

Zenkevich I, Komsta Ł, Heyden YV, Sherma J. Recurrent Relationships in Separation Science. в Komsta I, van Heyden Y, Sherma J, Редакторы, Chemometrics in Chromatography. 1st Edition ред. New York: Taylor & Francis. 2017. стр. 449-468

Author

Zenkevich, Igor ; Komsta, Łukasz ; Heyden, Yvan Vander ; Sherma, Joseph . / Recurrent Relationships in Separation Science. Chemometrics in Chromatography. Редактор / I. Komsta ; Y. van Heyden ; J. Sherma. 1st Edition. ред. New York : Taylor & Francis, 2017. стр. 449-468

BibTeX

@inbook{ca6cac1e3bd449a9836c948c1ed4a93d,
title = "Recurrent Relationships in Separation Science",
abstract = "Principal predestinations of different kinds of chromatography and related (hyphenated) separation methods are identification of analytes in multicomponent samples by non-spectroscopic methods and their quantitation. The first problem is solved using retention parameters of analytes, while the second is based on processing their peak areas. However, the search for new approaches remains an actual problem in separation science. Thus, such an unusual class of mathematical dependencies as recurrent relations was recommended for use in chemistry and, in particular, in chromatography. Recurrent relations allow revealing the existence of limiting values of both discrete and continuous properties. Recurrent equations are a special class of mathematical objects that are used most extensively for discrete functions of integer arguments. In solving the problem of estimating the gas chromatography retention parameters of a sorbate from the data obtained at other temperatures, several values in limited temperature intervals are considered as a rule.",
author = "Igor Zenkevich and {\L}ukasz Komsta and Heyden, {Yvan Vander} and Joseph Sherma",
year = "2017",
language = "English",
pages = "449--468",
editor = "I. Komsta and {van Heyden}, Y. and J. Sherma",
booktitle = "Chemometrics in Chromatography",
publisher = "Taylor & Francis",
address = "United Kingdom",
edition = "1st Edition",

}

RIS

TY - CHAP

T1 - Recurrent Relationships in Separation Science

AU - Zenkevich, Igor

AU - Komsta, Łukasz

AU - Heyden, Yvan Vander

AU - Sherma, Joseph

PY - 2017

Y1 - 2017

N2 - Principal predestinations of different kinds of chromatography and related (hyphenated) separation methods are identification of analytes in multicomponent samples by non-spectroscopic methods and their quantitation. The first problem is solved using retention parameters of analytes, while the second is based on processing their peak areas. However, the search for new approaches remains an actual problem in separation science. Thus, such an unusual class of mathematical dependencies as recurrent relations was recommended for use in chemistry and, in particular, in chromatography. Recurrent relations allow revealing the existence of limiting values of both discrete and continuous properties. Recurrent equations are a special class of mathematical objects that are used most extensively for discrete functions of integer arguments. In solving the problem of estimating the gas chromatography retention parameters of a sorbate from the data obtained at other temperatures, several values in limited temperature intervals are considered as a rule.

AB - Principal predestinations of different kinds of chromatography and related (hyphenated) separation methods are identification of analytes in multicomponent samples by non-spectroscopic methods and their quantitation. The first problem is solved using retention parameters of analytes, while the second is based on processing their peak areas. However, the search for new approaches remains an actual problem in separation science. Thus, such an unusual class of mathematical dependencies as recurrent relations was recommended for use in chemistry and, in particular, in chromatography. Recurrent relations allow revealing the existence of limiting values of both discrete and continuous properties. Recurrent equations are a special class of mathematical objects that are used most extensively for discrete functions of integer arguments. In solving the problem of estimating the gas chromatography retention parameters of a sorbate from the data obtained at other temperatures, several values in limited temperature intervals are considered as a rule.

UR - https://www.taylorfrancis.com/books/edit/10.1201/9781315154404/chemometrics-chromatography-%C5%82ukasz-komsta-yvan-vander-heyden-joseph-sherma

M3 - Article in an anthology

SP - 449

EP - 468

BT - Chemometrics in Chromatography

A2 - Komsta, I.

A2 - van Heyden, Y.

A2 - Sherma, J.

PB - Taylor & Francis

CY - New York

ER -

ID: 34723319