Öz
Fractional factorialdesigns are commonly used in practice. In this article, the finite flelds theory and
polynomials over Galois fields were used to design 2k-1 designs with highest resolution.
Anahtar Kelimeler
Factorial designs Fractional factorial designs Finite fileds Galois field; Polynomials
Kaynakça
- F. Çall alp, (1999), Say lar Teorisi, Ystanbul.
- N. Danac o lu, (2005), Kesirli Çok Etkenli Deneylerde Çözüm ve En Az Sapma Kavram , H.Ü. Ystatistik Bölümü Doktora Tezi.
- A. Dey, (1985), Orthogonal Fractional Factorial Designs, New Delhi, Wiley Eastern.
- J. A. Gallian, (1986), Contemporary Abstract Algebra, D.C.Health and Company.
- W. C. Huffman, V. Pless, (2003), Fundemantals of Error Correcting Codes, Cambridge University Pres.
- A. Kaya, (1988), Say lar Kuram na Giri(, Yzmir.
- A. J. Menezes, S. A. Vanstone, P. C. Oorschot van, (1997), Handbook of Applied Cryptography, CRC Pres.
- D. C. Montgomery, (1984), Design and Analysis of Experiments, Second Edition, John Wiley&Sons, NY.
- G. Pistone, M. P. Rogartin, (2007), Algebraic Statistics of Level Codings for Fractional Factorial Designs,
- Journal of Statistical Plann. and Inf.,138, 234-244. T. Shirakura, T. Suetsugu, T. Tsuji, (2002), Constructions of Main Effect Plus Two Plans for 2mFactorials,
- Journal of Statistical Plann. and Inf., 105, 405-415. S. A. Vanstone, P. C. Oorschot van, (1989), An Introduction to Error-Correcting Codes with Application,s
- Kluwer Academic Publishers. D. Wiggert, 1978, Error-Control Coding and Applications, Artech House.
- H. Xu, (2009), Algorithm construction of efficient fractional factorial designs with large sizes, Technometrics, 51,3,262-277.
Öz
Kesirli çok
etkenli tasarımları, uygulamada yaygın olarak kullanılmaktadır. Bu çalışmada,
sonlu cisim teorisinden, Galois cisimleri üzerindeki polinomlardan
yararlanarak, 2k-1tasarımlarının nasıl oluşturulabileceği
gösterilmiştir.
Anahtar Kelimeler
Çok etkenli tasarımlar Kesirli çok etkenli tasarımlar sonlu cisimler Galois cismi polinomlar
Kaynakça
- F. Çall alp, (1999), Say lar Teorisi, Ystanbul.
- N. Danac o lu, (2005), Kesirli Çok Etkenli Deneylerde Çözüm ve En Az Sapma Kavram , H.Ü. Ystatistik Bölümü Doktora Tezi.
- A. Dey, (1985), Orthogonal Fractional Factorial Designs, New Delhi, Wiley Eastern.
- J. A. Gallian, (1986), Contemporary Abstract Algebra, D.C.Health and Company.
- W. C. Huffman, V. Pless, (2003), Fundemantals of Error Correcting Codes, Cambridge University Pres.
- A. Kaya, (1988), Say lar Kuram na Giri(, Yzmir.
- A. J. Menezes, S. A. Vanstone, P. C. Oorschot van, (1997), Handbook of Applied Cryptography, CRC Pres.
- D. C. Montgomery, (1984), Design and Analysis of Experiments, Second Edition, John Wiley&Sons, NY.
- G. Pistone, M. P. Rogartin, (2007), Algebraic Statistics of Level Codings for Fractional Factorial Designs,
- Journal of Statistical Plann. and Inf.,138, 234-244. T. Shirakura, T. Suetsugu, T. Tsuji, (2002), Constructions of Main Effect Plus Two Plans for 2mFactorials,
- Journal of Statistical Plann. and Inf., 105, 405-415. S. A. Vanstone, P. C. Oorschot van, (1989), An Introduction to Error-Correcting Codes with Application,s
- Kluwer Academic Publishers. D. Wiggert, 1978, Error-Control Coding and Applications, Artech House.
- H. Xu, (2009), Algorithm construction of efficient fractional factorial designs with large sizes, Technometrics, 51,3,262-277.
Ayrıntılar
| Birincil Dil | Türkçe |
|---|---|
| Konular | Mühendislik |
| Bölüm | Araştırma Makalesi |
| Yazarlar | |
| Yayımlanma Tarihi | 30 Haziran 2010 |
| Yayımlandığı Sayı | Yıl 2010 Cilt: 3 Sayı: 1 |