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Your search keyword '"Košir, Tomaž"' showing total 6 results
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6 results on '"Košir, Tomaž"'

5. A Groebner basis for the determinantal ideal mod

Author

Košir, Tomaž and Sethuraman, B.A.

Subjects
*ALGEBRAIC fields, *MATHEMATICS, *POLYNOMIAL rings, *ALGEBRA
Abstract

Abstract: In an earlier paper [T. Košir, B.A. Sethuraman, Determinantal varieties over truncated polynomial rings, J. Pure Appl. Algebra 195 (2005) 75–95] we had begun a study of the components and dimensions of the spaces of th order jets of the classical determinantal varieties: these are the varieties obtained by considering generic () matrices over rings of the form , and for some fixed r, setting the coefficients of powers of t of all minors to zero. In this paper, we consider the case where , and provide a Groebner basis for the ideal which defines the tangent bundle to the classical determinantal variety. We use the results of these Groebner basis calculations to describe the components of the varieties where r is arbitrary. (The components of and were already described in the above cited paper.) [Copyright &y& Elsevier]

Published
2005
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6. Linear algebra over semirings

Author

Zakeršnik, Jimmy and Košir, Tomaž

Subjects
udc:512, semimodule, pideterminant, characteristic pipolynomial, polmodul, Linearna algebra, pideterminanta, karakteristični pipolinom, generalized Cayley-Hamilton theorem, polkolobar, Linear algebra, algebra, dioid, semiring, posplošeni Cayley-Hamiltonov izrek
Abstract

Delo obravnava algebraično strukturo polkolobarja z dodatno pozornostjo dano na posebni primer dioida. Množica $R$ je polkolobar za binarni notranji operaciji $oplus$ in $otimes$, če je $(R,oplus)$ komutativen monoid z enoto $0$, $(R,otimes)$ monoid z enoto $1$, med $otimes$ in $oplus$ velja leva ali desna distributivnost ter velja, da $0$ izniči $otimes$, torej ⠀$forall a in R a otimes 0 = 0otimes a = 0$. Če je $(R,oplus)$ poleg tega še delno urejen s kanonično relacijo $le$, polkolobarju $(R,oplus,otimes)$ pravimo dioid. Tako pojem dioida kot pojem polkolobarja obstajata že nekaj časa in mnogo klasičnih vprašanj v povezavi s temi strukturami, s stališča linearne algebre, že ima odgovore. V nalogi bodo obravnavana zgolj osnovna izmed teh. Obravnavana vprašanja so predvsem centrirana na lastnostih polkolobarjev in dioidov ter posplošitvah konceptov iz klasične linearne algebre nad polji, kot so obstoj in lastnosti baz $R$-polmodula nad polkolobarjem $R$, lastnosti in obrnljivost matrik nad polkolobarjem $R$ ter Cayley-Hamiltonov izrek. This paper discusses the algebraic structure of a semiring, with additional attention given to the special case of a dioid. The set $R$ is a semiring for the binary internal laws $oplus$ and $otimes$ if $(R,oplus)$ is a commutative monoid with the neutral element $0$, $(R,otimes)$ is a monoid with the neutral element $1$, $otimes$ is left- or right-distributive with respect to $oplus$ and if $0$ is absorbing for $otimes$, i. e. $forall a in R a otimes 0 = 0otimes a = 0$. If additionally $(R,oplus)$ is also ordered with the canonical order relation $le$, we instead call $(R,oplus,otimes)$ a dioid. Both terms have existed for some time now and most of the classical questions relating to the structures, from the perspective of linear algebra, have already been answered. From among those, this paper will present some of the more elementary results. In particular, the focus will be on properties of semirings and dioids and on generalizations of concepts from classical linear algebra over fields such as the existence and properties of bases of an $R$-semimodule, the properties and invertibility of a matrix over a semiring $R$ and the Cayley-Hamilton theorem.

Published
2023

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