BibTex Citation Data :
@article{JM674, author = {Bambang Irawanto}, title = {KETERHUBUNGAN GALOIS FIELD DAN LAPANGAN PEMISAH}, journal = {MATEMATIKA}, volume = {4}, number = {1}, year = {2010}, keywords = {}, abstract = { In this paper, it was learned of the necessary and sufficient condition for finite field with p n elements, p prime and n ³ 1 an integer. A field F is an extention field of a field K if K subfield F. The extension field F of field K is Splitting field of collection polinomial \{ f i (x) | i Î I \} of K if F smallest subfield containing K and all the zeros in of the polinomial f i (x). The zeros of polinomial f i (x) are elements of field F and the elements of F is finite then F is finite field (Galois fileld). F is finite with p n elements, p prime and n ³ 1 an integer if only if F is Splitting field of - x over Zp. }, url = {https://ejournal.undip.ac.id/index.php/matematika/article/view/674} }
Refworks Citation Data :
In this paper, it was learned of the necessary and sufficient condition for finite field with pn elements, p prime and n ³ 1 an integer. A field F is an extention field of a field K if K subfield F. The extension field F of field K is Splitting field of collection polinomial { fi (x) | i Î I } of K if F smallest subfield containing K and all the zeros in of the polinomial fi(x). The zeros of polinomial fi(x) are elements of field F and the elements of F is finite then F is finite field (Galois fileld). F is finite with pn elements, p prime and n ³ 1 an integer if only if F is Splitting field of - x over Zp.
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