On the inverses of Kasami and Bracken-Leander exponents

03/28/2020
by   Lukas Kölsch, et al.
0

We explicitly determine the binary representation of the inverse of all Kasami exponents K_r=2^2r-2^r+1 modulo 2^n-1 for all possible values of n and r. This includes as an important special case the APN Kasami exponents with (r,n)=1. As a corollary, we determine the algebraic degree of the inverses of the Kasami functions. In particular, we show that the inverse of an APN Kasami function on F_2^n always has algebraic degree n+1/2 if n≡ 0 3. For n≢0 3 we prove that the algebraic degree is bounded from below by n/3. We consider Kasami exponents whose inverses are quadratic exponents or Kasami exponents. We also determine the binary representation of the inverse of the Bracken-Leander exponent BL_r=2^2r+2^r+1 modulo 2^n-1 where n=4r and r odd. We show that the algebraic degree of the inverse of the Bracken-Leander function is n+2/2.

READ FULL TEXT

Please sign up or login with your details

Forgot password? Click here to reset