Título : |
Introducción a la computación cuántica para igenieros |
Tipo de documento: |
texto impreso |
Autores: |
Terán Pérez, David Moisés, Autor |
Mención de edición: |
1a ed. |
Editorial: |
Alfaomega Grupo Editor |
Fecha de publicación: |
2012 |
Número de páginas: |
xviii, 194 páginas |
Il.: |
Ilustraciones, graficos, tablas |
Dimensiones: |
23 cm. |
ISBN/ISSN/DL: |
978-607-707-542-4 |
Nota general: |
Incluye autoevaluación, bibliografía |
Idioma : |
Español (spa) |
Clasificación: |
621.392 T41 |
Nota de contenido: |
Introducción a la mecánica y física cuánticas -- Fundamentos cuánticos -- Cibernética cuántica -- Aplicaciones de la computación cuántica. |
Link: |
https://biblioteca.unap.edu.pe/opac_css/index.php?lvl=notice_display&id=86302 |
Introducción a la computación cuántica para igenieros [texto impreso] / Terán Pérez, David Moisés, Autor . - 1a ed. . - Alfaomega Grupo Editor, 2012 . - xviii, 194 páginas : Ilustraciones, graficos, tablas ; 23 cm. ISBN : 978-607-707-542-4 Incluye autoevaluación, bibliografía Idioma : Español ( spa)
Introducción a la computación cuántica para igenieros
Terán Pérez, David Moisés -
México : Alfaomega Grupo Editor - 2012
Incluye autoevaluación, bibliografía
Introducción a la mecánica y física cuánticas -- Fundamentos cuánticos -- Cibernética cuántica -- Aplicaciones de la computación cuántica.
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) 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