@article{MAKHILLJEAS2019142318716,
    title = {On Some Specific Patterns of &#964;-Adic Non-Adjacent Form Expansion over Ring Z (&#964;)},
    journal = {Journal of Engineering and Applied Sciences},
    volume = {14},
    number = {23},
    pages = {8609-8615},
    year = {2019},
    issn = {1816-949x},
    doi = {jeasci.2019.8609.8615},
    url = {https://makhillpublications.co/view-article.php?issn=1816-949x&doi=jeasci.2019.8609.8615},
    author = {F.,S.M.,Sh.K.,M.R.K and},
    keywords = {element,expansion,Frobenius map,successively,&#964;-adic non-adjacent form,Koblitz curve,TNAF},
    abstract = {Let &#964;=(-1)<sup>1-a</sup>+&#8730;-7/2 for a&#8712;{0, 1} is Frobenius map from the set E<sub>a</sub>(F<sub>2</sub>m) to it self for a point (x, y) on 
Koblitz curves E<sub>a</sub>. Let P and Q be two points on this curves. &#964;-adic Non-Adjacent Form (TNAF) of &alpha; an element of the ring Z(&#964;) = {&alpha; = c+d&#964;|c, d&#8712;Z} is an expansion where the digits are generated by successively dividing
&alpha; by &#964;, allowing remainders of -1, 0 or 1. The implementation of TNAF as the multiplier of scalar multiplication nP = Q
is one of the technique in elliptical curve cryptography. In this study, we find the formulas for TNAF that have
specific patterns [0, c<sub>1</sub>, &#133;, c<sub>1-1</sub>], [-1, c<sub>1</sub>, &#133;, c<sub>1-1</sub>], [1, c<sub>1</sub>, &#133;, c<sub>1-1</sub>] and [0, 0, 0, c<sub>3</sub>, c<sub>4</sub>, &#133;, c<sub>1-1</sub>].}
    }