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factors
numeric real factorization
Calling Sequence
[lnum,g]=factors(pol [,'flag']) [lnum,lden,g]=factors(rat [,'flag']) rat=factors(rat,'flag')
Arguments
- pol
real polynomial
- rat
real rational polynomial (
rat=pol1/pol2)- lnum
list of polynomials (of degrees 1 or 2)
- lden
list of polynomials (of degrees 1 or 2)
- g
real number
- flag
character string
'c'or'd'
Description
returns the factors of polynomial pol in the list lnum
and the "gain" g.
One has pol= g times product of entries of the list lnum
(if flag is not given). If flag='c' is given, then
one has |pol(i omega)| = |g*prod(lnum_j(i omega)|.
If flag='d' is given, then
one has |pol(exp(i omega))| = |g*prod(lnum_i(exp(i omega))|.
If argument of factors is a 1x1 rational rat=pol1/pol2,
the factors of the numerator pol1 and the denominator pol2
are returned in the lists lnum and lden respectively.
The "gain" is returned as g,i.e. one has:
rat= g times (product entries in lnum) / (product entries in lden).
If flag is 'c' (resp. 'd'), the roots of pol
are refected wrt the imaginary axis (resp. the unit circle), i.e.
the factors in lnum are stable polynomials.
Same thing if factors is invoked with a rational arguments:
the entries in lnum and lden are stable polynomials if
flag is given. R2=factors(R1,'c') or R2=factors(R1,'d')
with R1 a rational function or SISO syslin list then the
output R2 is a transfer with stable numerator and denominator and
with same magnitude as R1 along the imaginary axis ('c')
or unit circle ('d').
Examples
See Also
- simp — rational simplification
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