D-SIMPLE RINGS AND PRINCIPAL MAXIMAL IDEALS OF THE WEYL ALGEBRA
Glasgow mathematical journal, Tome 47 (2005) no. 2, pp. 269-285
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We prove that if the order-one differential operator $S=\partial_1 + \sum_{i=2}^{n} \beta_i\partial_i + \gamma$, with $\beta_i,\gamma \in K[x_1,\ldots,x_n]$, generates a maximal left ideal of the Weyl algebra $A_n(K)$, then $S$ does not admit any Darboux differential operator in $K[x_1,\ldots,x_n]\langle \partial_2,\ldots,\partial_n\rangle $; hence in particular, the derivation $\partial_1 + \sum_{i=2}^{n} \beta_i\partial_i$ does not admit any Darboux polynomial in $K[x_1,\ldots,x_n]$. We show that the converse is true when $\beta_i \in K[x_1,x_i]$, for every $i=2,\ldots,n$. Then, we generalize to $K[x_1,\ldots,x_n]$ the classical result of Shamsuddin that characterizes the simple linear derivations of $K[x_1,x_2]$. Finally, we establish a criterion for the left ideal generated by $S$ in $A_n(K)$ to be maximal in terms of the existence of polynomial solutions of a finite system of differential polynomial equations.
LEQUAIN, YVES; LEVCOVITZ, DANIEL; SOUZA, JOSÉ CARLOS DE. D-SIMPLE RINGS AND PRINCIPAL MAXIMAL IDEALS OF THE WEYL ALGEBRA. Glasgow mathematical journal, Tome 47 (2005) no. 2, pp. 269-285. doi: 10.1017/S001708950500248X
@article{10_1017_S001708950500248X,
author = {LEQUAIN, YVES and LEVCOVITZ, DANIEL and SOUZA, JOS\'E CARLOS DE},
title = {D-SIMPLE {RINGS} {AND} {PRINCIPAL} {MAXIMAL} {IDEALS} {OF} {THE} {WEYL} {ALGEBRA}},
journal = {Glasgow mathematical journal},
pages = {269--285},
year = {2005},
volume = {47},
number = {2},
doi = {10.1017/S001708950500248X},
url = {http://geodesic.mathdoc.fr/articles/10.1017/S001708950500248X/}
}
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%0 Journal Article %A LEQUAIN, YVES %A LEVCOVITZ, DANIEL %A SOUZA, JOSÉ CARLOS DE %T D-SIMPLE RINGS AND PRINCIPAL MAXIMAL IDEALS OF THE WEYL ALGEBRA %J Glasgow mathematical journal %D 2005 %P 269-285 %V 47 %N 2 %U http://geodesic.mathdoc.fr/articles/10.1017/S001708950500248X/ %R 10.1017/S001708950500248X %F 10_1017_S001708950500248X
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