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The differential equation y' = fy in the algebras H(D)

  • Autores: Alain Escassut, Marie-Claude Sarmant
  • Localización: Collectanea mathematica, ISSN 0010-0757, Vol. 39, Fasc. 1, 1988, págs. 31-40
  • Idioma: inglés
  • Títulos paralelos:
    • La ecuación diferencial y' = fy en las álgebras H(D)
  • Enlaces
  • Resumen
    • Let $D$ be an a clopen bounded infraconnected set in an algebraically closed complete ultrametric valued field, and $H(D)$ the Banach algebra of the analytic elements in $D$[10,11,3]. Let $f$ be an element of $H(D)$; we show that if the differential equation $f'=fy$ has a solution $g$ invertible in $H(D)$, then the space of the solutions in $H(D)$ has dimension 1. We prove that a solution $g$ has no zero isolated in $D$ and that if $g$ is not invertible, it is strictly annulled by a $T$-filter [6]. At last we prove that if $H(D)$ has no divisor of zero the space has dimension 0 or 1.


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