EUDML | A class of cyclic (v; k1, k2, k3; λ) difference families with v ≡ 3 (mod 4) a prime

Skip to main content (access key 's'), Skip to navigation (access key 'n'), Accessibility information (access key '0')

Displaying similar documents to “A class of cyclic (v; k1, k2, k3; λ) difference families with v ≡ 3 (mod 4) a prime”

Cyclotomy and complementary difference sets

G. Szekeres (1971)

Acta Arithmetica

Similarity:

Properties of Primes and Multiplicative Group of a Field

Kenichi Arai, Hiroyuki Okazaki (2009)

Formalized Mathematics

Similarity:

In the [16] has been proven that the multiplicative group Z/pZ* is a cyclic group. Likewise, finite subgroup of the multiplicative group of a field is a cyclic group. However, finite subgroup of the multiplicative group of a field being a cyclic group has not yet been proven. Therefore, it is of importance to prove that finite subgroup of the multiplicative group of a field is a cyclic group.Meanwhile, in cryptographic system like RSA, in which security basis depends upon the difficulty...

Some fourth degree Diophantine equations in Gaussian integers.

Szabó, Sándor (2004)

Integers

Similarity:

On the class of square Petrie matrices induced by cyclic permutations.

Du, Bau-Sen (2004)

International Journal of Mathematics and Mathematical Sciences

Similarity:

From a 1-rotational RBIBD to a partitioned difference family.

Buratti, Marco, Yan, Jie, Wang, Chengmin (2010)

The Electronic Journal of Combinatorics [electronic only]

Similarity:

Existence of an unramified cyclic extension and congruence conditions

Makoto Ishida (1988)

Acta Arithmetica

Similarity:

Analytical formulas for solutions of linear difference equations.

Andruch-Sobiło, Anna (2005)

Applied Mathematics E-Notes [electronic only]

Similarity:

The number of relatively prime subsets of ${1, 2, ..., n}$ .

Ayad, Mohamed, Kihel, Omar (2009)

Integers

Similarity:

On the order of magnitude of the difference between consecutive prime numbers

Harald Cramér (1936)

Acta Arithmetica

Similarity:

On powerful numbers.

Mollin, R.A., Walsh, P.G. (1986)

International Journal of Mathematics and Mathematical Sciences

Similarity:

Computation of cyclic parts of Steinhaus problem for power 5

K Chikawa, K Iséki, T Kusakabe, K Shibamura (1962)

Acta Arithmetica

Similarity: