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cmna (version 1.0.0)

gdls: Least squares with graident descent

Description

Solve least squares with graident descent

Usage

gdls(A, b, alpha = 0.05, tol = 1e-06, m = 1e+05)

Arguments

A

a square matrix representing the coefficients of a linear system

b

a vector representing the right-hand side of the linear system

alpha

the learning rate

tol

the expected error tolerance

m

the maximum number of iterations

Value

the modified matrix

Details

gdls solves a linear system using gradient descent.

See Also

Other linear: choleskymatrix, detmatrix, invmatrix, iterativematrix, lumatrix, refmatrix, rowops, tridiagmatrix, vecnorm

Examples

Run this code
# NOT RUN {
head(b <- iris$Sepal.Length)
head(A <- matrix(cbind(1, iris$Sepal.Width, iris$Petal.Length, iris$Petal.Width), ncol = 4))
gdls(A, b, alpha = 0.05, m = 10000)

# }

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