- In algebra, a
Mignotte bound can
refer to a
bound on
coefficients of
factor polynomials, see Landau-
Mignotte bound,
Mignotte's separation bound for zeros...
-
utilize essentially this idea, the
Mignotte and A****h–Bloom schemes,
which are
explained below. As said before, the
Mignotte threshold secret sharing scheme...
-
finite number of
perfect power Fibonacci numbers. In 2006, Y. Bugeaud, M.
Mignotte, and S.
Siksek proved that 8 and 144 are the only such non-trivial perfect...
- In algebra, a Landau-
Mignotte bound (sometimes only
referred to as
Mignotte's bound) is one of a
family of
inequalities concerning a
univariate integer...
- Recently,
Yabuta (2001) gave a
simple proof. Bilu, Hanrot,
Voutier and
Mignotte (2001)
extended it to the case of
negative discriminants (where it is true...
-
Tijdeman imply that the
number of
solutions in each case is finite. Bugeaud,
Mignotte and
Siksek solved equations of this type with A = 1 and 1 ≤ D ≤ 100. In...
- and
algebraic com****tion (Vol. 4).
Springer Science &
Business Media.
Mignotte, M. (2012).
Mathematics for
computer algebra.
Springer Science & Business...
-
bounds for root
separation that are
independent from the discriminant.
Mignotte's separation bound is sep ( p ) > 3 | Δ ( p ) | n ( n + 1 ) / 2 ( ‖ p...
- (1): 33–53. doi:10.4064/aa-56-1-33-53. ISSN 0065-1036. Belaga,
Edward G.;
Mignotte,
Maurice (1998). "Embedding the 3x+1
Conjecture in a 3x+d Context". Experimental...
- and
algebraic com****tion (Vol. 4).
Springer Science &
Business Media.
Mignotte, M. (2012).
Mathematics for
computer algebra.
Springer Science & Business...
