blaschkeProd: Calculate Blaschke products
In viscomplexr: Phase Portraits of Functions in the Complex Number Plane
Description
Usage
Arguments
Details
Value
See Also
Examples
Description
This function calculates Blaschke products
(https://en.wikipedia.org/wiki/Blaschke_product) for a complex number
z given a sequence a of complex numbers inside the unit disk,
which are the zeroes of the Blaschke product.
Usage
1
blaschkeProd(z, a)
Arguments
z
Complex number; the point in the complex plane to which the output
of the function is mapped
a
Vector of complex numbers located inside the unit disk. At each
a, the Blaschke product will have a zero.
Details
A sequence of points a[n] located inside the unit disk satisfies the
Blaschke condition, if sum[1:n] (1 - abs(a[n])) < Inf. For each
element a != 0 of such a sequence, B(a, z) = abs(a)/a * (a -
z)/(1 - conj(a) * z) can be calculated. For a = 0, B(a, z) =
z. The Blaschke product B(z) results as B(z) = prod[1:n]
(B(a[n], z)).
Value
The value of the Blaschke product at z.
See Also
Other maths:
jacobiTheta(),
juliaNormal(),
mandelbrot()
Examples
1
2
3
4
5
6
7
8
9
# Generate random vector of 17 zeroes inside the unit disk
n <- 17
a <- complex(modulus = runif(n, 0, 1), argument = runif(n, 0, 2*pi))
# Portrait the Blaschke product
phasePortrait(blaschkeProd, moreArgs = list(a = a),
xlim = c(-1.2, 1.2), ylim = c(-1.2, 1.2),
nCores = 1) # Max. two cores on CRAN, not a limit for your use
viscomplexr documentation built on Sept. 18, 2021, 5:06 p.m.
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Description Usage Arguments Details Value See Also Examples
Description
This function calculates Blaschke products
(https://en.wikipedia.org/wiki/Blaschke_product) for a complex number
z given a sequence a of complex numbers inside the unit disk,
which are the zeroes of the Blaschke product.
Usage
1 | blaschkeProd(z, a)
|
Arguments
z |
Complex number; the point in the complex plane to which the output of the function is mapped |
a |
Vector of complex numbers located inside the unit disk. At each
|
Details
A sequence of points a[n] located inside the unit disk satisfies the
Blaschke condition, if sum[1:n] (1 - abs(a[n])) < Inf. For each
element a != 0 of such a sequence, B(a, z) = abs(a)/a * (a -
z)/(1 - conj(a) * z) can be calculated. For a = 0, B(a, z) =
z. The Blaschke product B(z) results as B(z) = prod[1:n]
(B(a[n], z)).
Value
The value of the Blaschke product at z.
See Also
Other maths:
jacobiTheta(),
juliaNormal(),
mandelbrot()
Examples
1 2 3 4 5 6 7 8 9 | # Generate random vector of 17 zeroes inside the unit disk
n <- 17
a <- complex(modulus = runif(n, 0, 1), argument = runif(n, 0, 2*pi))
# Portrait the Blaschke product
phasePortrait(blaschkeProd, moreArgs = list(a = a),
xlim = c(-1.2, 1.2), ylim = c(-1.2, 1.2),
nCores = 1) # Max. two cores on CRAN, not a limit for your use
|
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