Cauchy integral along a circular arc
y = intl(a, b, z0, r, f) y = intl(a, b, z0, r, f, abserr) y = intl(a, b, z0, r, f, abserr, relerr)
1.d-13
and 1d-8
.
If f
is a complex-valued function,
intl(a,b,z0,r,f)
computes the integral of
f(z)dz
along the curve in the complex plane defined by
z0 + r.*exp(%i*t)
for a<=t<=b
.(part of the circle with center z0
and radius
r
with phase between a
and
b
).
Version | Description |
2024.0.0 | Default abserr and relerr values
standardized: 1d-13 and 1d-8 instead of
%eps and 1d-12 . |