gaussfitn

Versión 1.1.2 (3,08 KB) por Matt J
Fit N-dimensional scattered points with Gaussian+constant
607 Descargas
Actualizado 11 ago 2022

Ver licencia

This function uses lsqcurvefit to fit parameters D, A, mu, sig to the R^N-->R
Gaussian+constant model function,
z(x) = D + A*exp( -0.5 * (x-mu).' * inv(sig) *(x-mu) )
Here A and D are unknown scalars, mu is an unknown Nx1 mean vector, and sig is an
unknown NxN covariance matrix. By imposing lower and upper bounds 0<=D<=0 (see below), this can also be used to perform pure Gaussian fitting.
SYNTAX:
[params,resnorm, residual,exitflag,output] = gaussfitn(xdata,zdata,params0,LB,UB,Name,Value)
INPUTS (required):
xdata: MxN matrix whose rows specify M scattered samples in R^N
zdata: Mx1 vector of corresponding samples z(xdata)
INPUTS (optional)
params0: Cell array of initial parameter estimates {D0,A0,mu0,sig0}.
Can also be empty [] in which case default initial guesses
are autogenerated. Can also consist of cell array of empty
and non-empty elements like {D0,[],mu0,[]} in which case
default initial guesses are generated for select parameters.
LB: Cell array of lower bounds {D_LB, A_LB, mu_LB} on D, A, and mu.
UB: Cell array of upper bounds {D_UB, A_UB, mu_UB} on D, A, and mu.
Name,Value: Name/Value option pairs compatible with lsqcurvefit. See,
<https://www.mathworks.com/help/optim/ug/lsqcurvefit.html#buuhcjo-options>.
By default, however, SpecifyConstraintGradient=true unless
over-ridden.
OUTPUTS:
params: Final estimate of the parameters as a cell array {D,A,mu,sig}
resnorm: As in lsqcurvefit
residual: As in lsqcurvefit
exitflag: As in lsqcurvefit
output: As in lsqcurvefit

Citar como

Matt J (2024). gaussfitn (https://www.mathworks.com/matlabcentral/fileexchange/69116-gaussfitn), MATLAB Central File Exchange. Recuperado .

Compatibilidad con la versión de MATLAB
Se creó con R2018a
Compatible con cualquier versión desde R2016b
Compatibilidad con las plataformas
Windows macOS Linux
Categorías
Más información sobre Ordinary Differential Equations en Help Center y MATLAB Answers.

Community Treasure Hunt

Find the treasures in MATLAB Central and discover how the community can help you!

Start Hunting!
Versión Publicado Notas de la versión
1.1.2

Typo correction

1.1.1

Small fix to the improved mu0/sig0 estimation method

1.1.0

Improved initial guesses of mu0 and sig0.

1.0.2

No change

1.0.1

Description modification

1.0.0