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A New Singular Matrix Method for Balancing Chemical Equations and Their Stability
Author(s) -
Risteski Ice B.
Publication year - 2009
Publication title -
journal of the chinese chemical society
Language(s) - English
Resource type - Journals
SCImago Journal Rank - 0.329
H-Index - 45
eISSN - 2192-6549
pISSN - 0009-4536
DOI - 10.1002/jccs.200900011
Subject(s) - moore–penrose pseudoinverse , chemical equation , matrix (chemical analysis) , chemistry , work (physics) , stability (learning theory) , chemical reaction , mathematics , thermodynamics , computer science , organic chemistry , physics , inverse , chromatography , machine learning , geometry
In this work is given a new singular matrix method for balancing new classes of chemical equations which reduce to an n × n matrix. The method offered here is founded by virtue of the solution of a homogeneous matrix equation by using of Drazin pseudoinverse matrix. The method has been tested on many typical chemical equations and found to be very successful for the all equations in our extensive balancing research. This method works successfully without any limitations. Chemical equations treated here possess atoms with fractional oxidation numbers. Also, in the present work are analyzed some necessary and sufficient criteria for stability of chemical equations over stability of their reaction matrices.