-
coprimality is a
stronger condition than
setwise coprimality;
every pairwise coprime finite set is also
setwise coprime, but the
reverse is not true. For...
-
approximated equally well (thus,
convergence is non-uniform in f). The
notion of
setwise convergence formalizes the ****ertion that the
measure of each measurable...
- The
Frobenius number exists as long as the set of coin
denominations is
setwise coprime.
There is an
explicit formula for the
Frobenius number when there...
-
equation describes a
Heronian triangle. If the
three side
lengths are
setwise coprime (meaning that the
greatest common divisor of all
three sides is...
-
exactly five
elements of this
group that
leave the
starting block fixed setwise,
namely those such that b=c=0 and ad=1 so that f(z) = a2 z. So
there will...
-
Because of the homogeneity, one can
consider only
parameters that are
setwise coprime integers. If Q ( X 0 , … , X n ) = 0 {\displaystyle Q(X_{0},\ldots...
- set S is
fixed in the
power set of U. (Some
authors use the
terminology setwise invariant, vs.
pointwise invariant, to
distinguish between these cases...
-
Pythagorean n-tuple; and
there is a one-to-one
correspondence between tuples of
setwise coprime positive integers (m1, ..., mn)
satisfying m2 1 > m2 2 + ... +...
-
necessary (but not sufficient): The
number of taps is even. The set of taps is
setwise co-prime; i.e.,
there must be no
divisor other than 1
common to all taps...
- .
Vojta (1998)
proposed a
stronger variant of the n conjecture,
where setwise coprimeness of a 1 , a 2 , . . . , a n {\displaystyle a_{1},a_{2},...,a_{n}}...
