Equivalence of differential equations and differential algebras

Jakubczyk, Bronisłav

Displaying similar documents to “Equivalence of differential equations and differential algebras”

Addition and correction to the paper "Diagonal algebras"

Jerzy Płonka (1973)

Fundamenta Mathematicae

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Nonassociative real H*-algebras.

Miguel Cabrera, José Martínez Aroza, Angel Rodríguez Palacios (1988)

Publicacions Matemàtiques

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We prove that, if A denotes a topologically simple real (non-associative) H*-algebra, then either A is a topologically simple complex H*-algebra regarded as real H*-algebra or there is a topologically simple complex H*-algebra B with *-involution τ such that A = {b ∈ B : τ(b) = b*}. Using this, we obtain our main result, namely: (algebraically) isomorphic topologically simple real H*-algebras are actually *-isometrically isomorphic.

The class of 2-dimensional neat reducts is not elementary

Tarek Sayed Ahmed (2002)

Fundamenta Mathematicae

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SC, CA, QA and QEA stand for the classes of Pinter's substitution algebras, Tarski's cylindric algebras, Halmos' quasipolyadic algebras and Halmos' quasipolyadic algebras with equality, respectively. Generalizing a result of Andréka and Németi on cylindric algebras, we show that for K ∈ SC,QA,CA,QEA and any β > 2 the class of 2-dimensional neat reducts of β-dimensional algebras in K is not closed under forming elementary subalgebras, hence is not elementary. Whether this result extends...

On B-algebras

J. Neggers, Hee Sik Kim (2002)

Matematički Vesnik

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Nonlinear separable equations in linear spaces and commutative Leibniz algebras

D. Przeworska-Rolewicz (2010)

Annales Polonici Mathematici

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We consider nonlinear equations in linear spaces and algebras which can be solved by a "separation of variables" obtained due to Algebraic Analysis. It is shown that the structures of linear spaces and commutative algebras (even if they are Leibniz algebras) are not rich enough for our purposes. Therefore, in order to generalize the method used for separable ordinary differential equations, we have to assume that in algebras under consideration there exist logarithmic mappings. Section...

A construction of mirror $Q$ -algebras.

So, Keum Sook (2011)

International Journal of Mathematics and Mathematical Sciences

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A general existence theorem on partial algebras and its special cases

J. Schmidt (1966)

Colloquium Mathematicae

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Some remarks on Post algebras

R. Beazer (1974)

Colloquium Mathematicae

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Extensions of certain real rank zero $C^{*}$ -algebras

Marius Dadarlat, Terry A. Loring (1994)

Annales de l'institut Fourier

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G. Elliott extended the classification theory of $A F$ -algebras to certain real rank zero inductive limits of subhomogeneous $C^{*}$ -algebras with one dimensional spectrum. We show that this class of $C^{*}$ -algebras is not closed under extensions. The relevant obstruction is related to the torsion subgroup of the $K_{1}$ -group. Perturbation and lifting results are provided for certain subhomogeneous $C^{*}$ -algebras.