SIFAT-SIFAT DASAR PERLUASAN INTEGRAL LEBESGUE
EL-Integral is extended of Lebesgue integral, 1 k b EL f d L f d . Lebesgue integral is defined with early arrange measure theory that famous with Lebesgue measure. A function f :ï›a,bï is said EL-integrable on ï›a,bï , if there exist series interval that no piled up ï» ï½ k I in ï›a,bï so tha...
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| Language: | English |
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Universitas Pattimura
2012-12-01
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| Series: | Barekeng |
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| Online Access: | https://ojs3.unpatti.ac.id/index.php/barekeng/article/view/211 |
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| author | Yopi A. Lesnussa Henry J. Wattimanela Mozart W. Talakua |
| author_facet | Yopi A. Lesnussa Henry J. Wattimanela Mozart W. Talakua |
| author_sort | Yopi A. Lesnussa |
| collection | DOAJ |
| description | EL-Integral is extended of Lebesgue integral, 1 k b EL f d L f d . Lebesgue integral is defined with early arrange measure theory that famous with Lebesgue measure. A function f :ï›a,bï is said EL-integrable on ï›a,bï , if there exist series interval that no piled up ï» ï½ k I in ï›a,bï so that ï€¨ï› , ï  0 k ï a b ï€ I  ,   k f L I for every k and 1 Ik
A L f dï finite. Value A is called value of EL Integral function f on ï›a,bï . Extended of Lebesgue integral (EL-Integral) is notated by :  kbE a k I EL f dï f dï L f dï
ï‚¥

     . |
| format | Article |
| id | doaj-art-88fbfdef8e1947b89de241ddab756fc3 |
| institution | DOAJ |
| issn | 1978-7227 2615-3017 |
| language | English |
| publishDate | 2012-12-01 |
| publisher | Universitas Pattimura |
| record_format | Article |
| series | Barekeng |
| spelling | doaj-art-88fbfdef8e1947b89de241ddab756fc32025-08-20T03:05:42ZengUniversitas PattimuraBarekeng1978-72272615-30172012-12-0162374410.30598/barekengvol6iss2pp37-44211SIFAT-SIFAT DASAR PERLUASAN INTEGRAL LEBESGUEYopi A. Lesnussa0Henry J. Wattimanela1Mozart W. Talakua2Jurusan Matematika FMIPA Universitas PattimuraJurusan Matematika FMIPA Universitas PattimuraJurusan Matematika FMIPA Universitas PattimuraEL-Integral is extended of Lebesgue integral, 1 k b EL f d L f d . Lebesgue integral is defined with early arrange measure theory that famous with Lebesgue measure. A function f :ï›a,bï is said EL-integrable on ï›a,bï , if there exist series interval that no piled up ï» ï½ k I in ï›a,bï so that ï€¨ï› , ï  0 k ï a b ï€ I  ,   k f L I for every k and 1 Ik A L f dï finite. Value A is called value of EL Integral function f on ï›a,bï . Extended of Lebesgue integral (EL-Integral) is notated by :  kbE a k I EL f dï f dï L f dï ï‚¥       .https://ojs3.unpatti.ac.id/index.php/barekeng/article/view/211measure space, lebesgue measure, lebesgue integral, sifat-sifat dasar el-integral. |
| spellingShingle | Yopi A. Lesnussa Henry J. Wattimanela Mozart W. Talakua SIFAT-SIFAT DASAR PERLUASAN INTEGRAL LEBESGUE Barekeng measure space, lebesgue measure, lebesgue integral, sifat-sifat dasar el-integral. |
| title | SIFAT-SIFAT DASAR PERLUASAN INTEGRAL LEBESGUE |
| title_full | SIFAT-SIFAT DASAR PERLUASAN INTEGRAL LEBESGUE |
| title_fullStr | SIFAT-SIFAT DASAR PERLUASAN INTEGRAL LEBESGUE |
| title_full_unstemmed | SIFAT-SIFAT DASAR PERLUASAN INTEGRAL LEBESGUE |
| title_short | SIFAT-SIFAT DASAR PERLUASAN INTEGRAL LEBESGUE |
| title_sort | sifat sifat dasar perluasan integral lebesgue |
| topic | measure space, lebesgue measure, lebesgue integral, sifat-sifat dasar el-integral. |
| url | https://ojs3.unpatti.ac.id/index.php/barekeng/article/view/211 |
| work_keys_str_mv | AT yopialesnussa sifatsifatdasarperluasanintegrallebesgue AT henryjwattimanela sifatsifatdasarperluasanintegrallebesgue AT mozartwtalakua sifatsifatdasarperluasanintegrallebesgue |