论文信息 - Existence and Explicit Constructions of q + 1 Regular Ramanujan Graphs for Every Prime Power q

Existence and Explicit Constructions of q + 1 Regular Ramanujan Graphs for Every Prime Power q

For any prime power q, we give explicit constructions for many infinite linear families of q + 1 regular Ramanujan graphs. This partially solves a problem that was raised by A. Lubotzky, R. Phillips, and P. Sarnak. They gave the same results as here, but only for q being prime and not equal to two, and raised the question of the existence and explicit construction of such graphs for other degrees of regularity. Moreover, our construction removes the nondeterministic part of finding large prime numbers, which for some applications may appear in their construction. Our graphs are given as Cayley graphs of PGL2 or PSL2 over finite fields, with respect to very simple generators. They also satisfy all other extremal combinatorial properties that those of Lubotsky, Phillips, and Sarnak do.

Moshe Morgenstern | Moshe Morgenstern

[1] André Weil,et al. Basic number theory , 1967 .

[2] Victor Shoup,et al. New algorithms for finding irreducible polynomials over finite fields , 1988, [Proceedings 1988] 29th Annual Symposium on Foundations of Computer Science.

[3] Gopal Prasad,et al. Strong approximation for semi-simple groups over function fields , 1977 .

[4] A. Albert. Structure of Algebras , 1939 .

[5] Noga Alon,et al. lambda1, Isoperimetric inequalities for graphs, and superconcentrators , 1985, J. Comb. Theory, Ser. B.

[6] Alexander Lubotzky,et al. Discrete groups, expanding graphs and invariant measures , 1994, Progress in mathematics.

[7] Maria M. Klawe,et al. Limitations on Explicit Constructions of Expanding Graphs , 1984, SIAM J. Comput..

[8] Stephen S. Gelbart,et al. Automorphic forms on Adele groups , 1975 .

[9] M. Vignéras. Arithmétique des Algèbres de Quaternions , 1980 .

[10] Zvi Galil,et al. Explicit Constructions of Linear-Sized Superconcentrators , 1981, J. Comput. Syst. Sci..

[11] Leonard Tornheim. Integral Sets of Quaternion Algebras Over a Function Field , 1940 .

[12] Noga Alon,et al. Eigenvalues and expanders , 1986, Comb..