### TABLE III Computational results for asymptotic merit factor for various quadratic constructions

2005

Cited by 4

### TABLE I The Number of Quadratic Coset Leaders for Construction (2) when t = 2

### TABLE II The Number of Quadratic Coset Leaders for Construction (2) when t = 3

### Table 4.4. Summary of the main invariants of the 47 sextic 2-adic fields and the 75 sextic 3-adic fields. Galois groups are described in their twin form to emphasize that most of these fields can be directly built from fields of lower degree. Wild slopes which are in SC(K) are in bold.

Cited by 2

### Table 5. Summary of multiplicative costs for quartic extensions as quadratic over quadratic

"... In PAGE 10: ... The corresponding costs based on Fp operations depend on the choice of multiplication methods for the (bottom) quadratic extension field. Table5 shows the multiplicative costs for Fp4 as a quadratic over quadratic, and Table 6 shows the squaring costs. Table 5.... ..."

### Table 1. Extension Field Construction, k=10

2007

Cited by 1

### Table 3. Extension Field Construction, k=12

2007

Cited by 1

### Table 5. Fully pipelined Galois field multiplication on the Montium architecture Clk 1 2 3 4 5 6 1st log ALU exp output/log ALU exp

"... In PAGE 7: ... The fully pipelined approach puts the exponent table in a separate memory. The advantage is that the log phase and the exp phase can now be performed in parallel as shown in Table5 . The pipelined implementation is shown in Figure 5.... ..."