BibTex Citation Data :
@article{JM262, author = {Nunung A and Bambang Irawanto}, title = {MENENTUKAN POLINOMIAL MINIMAL ATAS GF p}, journal = {MATEMATIKA}, volume = {11}, number = {2}, year = {2010}, keywords = {}, abstract = { Let is finite field with elements, denoted by . If be an extension field of and is the algebra element of , then , polynomial of of smallest degree such that called minimal polynomial of . If is primitive element, then whose called primitive polynomial, is the minimal polynomial of whose generate the elements of .The minimal polynomial of whose generate the elements of is the factor of , because the elements of are the solution of . So, if and are known we have . If we factoring it, will be obtained , the minimal polynomial of whose generate the elements of , where is some irreducible factor in of degree that contain a primitive element. }, url = {https://ejournal.undip.ac.id/index.php/matematika/article/view/262} }
Refworks Citation Data :
Let is finite field with elements, denoted by . If be an extension field of and is the algebra element of , then , polynomial of of smallest degree such that called minimal polynomial of . If is primitive element, then whose called primitive polynomial, is the minimal polynomial of whose generate the elements of .The minimal polynomial of whose generate the elements of is the factor of , because the elements of are the solution of . So, if and are known we have . If we factoring it, will be obtained , the minimal polynomial of whose generate the elements of , where is some irreducible factor in of degree that contain a primitive element.
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