Gaussian function

Relation to standard Gaussian integral

The integral $${\displaystyle \int _{-\infty }^{\infty }ae^{-(x-b)^{2}/2c^{2}}\,dx}$$ for some real constants a, b and c > 0 can be calculated by putting it into the form of a Gaussian integral. First, the constant a can simply be factored out of the integral. Next, the variable of integration is changed from x to y = x − b: $${\displaystyle a\int _{-\infty }^{\infty }e^{-y^{2}/2c^{2}}\,dy,}$$ and then to ${\displaystyle z=y/{\sqrt {2c^{2}}}}$: $${\displaystyle a{\sqrt {2c^{2}}}\int _{-\infty }^{\infty }e^{-z^{2}}\,dz.}$$

Then, using the Gaussian integral identity $${\displaystyle \int _{-\infty }^{\infty }e^{-z^{2}}\,dz={\sqrt {\pi }},}$$

we have $${\displaystyle \int _{-\infty }^{\infty }ae^{-(x-b)^{2}/2c^{2}}\,dx=a{\sqrt {2\pi c^{2}}}.}$$

Meaning of parameters for the general equation

For the general form of the equation the coefficient A is the height of the peak and (x₀, y₀) is the center of the blob.

If we set$${\displaystyle {\begin{aligned}a&={\frac {\cos ^{2}\theta }{2\sigma _{X}^{2}}}+{\frac {\sin ^{2}\theta }{2\sigma _{Y}^{2}}},\\b&=-{\frac {\sin \theta \cos \theta }{2\sigma _{X}^{2}}}+{\frac {\sin \theta \cos \theta }{2\sigma _{Y}^{2}}},\\c&={\frac {\sin ^{2}\theta }{2\sigma _{X}^{2}}}+{\frac {\cos ^{2}\theta }{2\sigma _{Y}^{2}}},\end{aligned}}}$$then we rotate the blob by a positive, counter-clockwise angle ${\displaystyle \theta }$ (for negative, clockwise rotation, invert the signs in the b coefficient).^[4]

To get back the coefficients ${\displaystyle \theta }$, ${\displaystyle \sigma _{X}}$ and ${\displaystyle \sigma _{Y}}$ from ${\displaystyle a}$, ${\displaystyle b}$ and ${\displaystyle c}$ use

${\displaystyle {\begin{aligned}\theta &={\frac {1}{2}}\arctan \left({\frac {2b}{a-c}}\right),\quad \theta \in [-45,45],\\\sigma _{X}^{2}&={\frac {1}{2(a\cdot \cos ^{2}\theta +2b\cdot \cos \theta \sin \theta +c\cdot \sin ^{2}\theta )}},\\\sigma _{Y}^{2}&={\frac {1}{2(a\cdot \sin ^{2}\theta -2b\cdot \cos \theta \sin \theta +c\cdot \cos ^{2}\theta )}}.\end{aligned}}}$

Example rotations of Gaussian blobs can be seen in the following examples:

Using the following Octave code, one can easily see the effect of changing the parameters:

A = 1;
x0 = 0; y0 = 0;

sigma_X = 1;
sigma_Y = 2;

[X, Y] = meshgrid(-5:.1:5, -5:.1:5);

for theta = 0:pi/100:pi
    a = cos(theta)^2 / (2 * sigma_X^2) + sin(theta)^2 / (2 * sigma_Y^2);
    b = sin(2 * theta) / (4 * sigma_X^2) - sin(2 * theta) / (4 * sigma_Y^2);
    c = sin(theta)^2 / (2 * sigma_X^2) + cos(theta)^2 / (2 * sigma_Y^2);

    Z = A * exp(-(a * (X - x0).^2 + 2 * b * (X - x0) .* (Y - y0) + c * (Y - y0).^2));

    surf(X, Y, Z);
    shading interp;
    view(-36, 36)
    waitforbuttonpress
end

Such functions are often used in image processing and in computational models of visual system function—see the articles on scale space and affine shape adaptation.

Also see multivariate normal distribution.

Higher-order Gaussian or super-Gaussian function

A more general formulation of a Gaussian function with a flat-top and Gaussian fall-off can be taken by raising the content of the exponent to a power ${\displaystyle P}$: $${\displaystyle f(x)=A\exp \left(-\left({\frac {(x-x_{0})^{2}}{2\sigma _{X}^{2}}}\right)^{P}\right).}$$

This function is known as a super-Gaussian function and is often used for Gaussian beam formulation.^[5] This function may also be expressed in terms of the full width at half maximum (FWHM), represented by w: $${\displaystyle f(x)=A\exp \left(-\ln 2\left(4{\frac {(x-x_{0})^{2}}{w^{2}}}\right)^{P}\right).}$$

In a two-dimensional formulation, a Gaussian function along ${\displaystyle x}$ and ${\displaystyle y}$ can be combined^[6] with potentially different ${\displaystyle P_{X}}$ and ${\displaystyle P_{Y}}$ to form a rectangular Gaussian distribution: $${\displaystyle f(x,y)=A\exp \left(-\left({\frac {(x-x_{0})^{2}}{2\sigma _{X}^{2}}}\right)^{P_{X}}-\left({\frac {(y-y_{0})^{2}}{2\sigma _{Y}^{2}}}\right)^{P_{Y}}\right).}$$ or an elliptical Gaussian distribution: $${\displaystyle f(x,y)=A\exp \left(-\left({\frac {(x-x_{0})^{2}}{2\sigma _{X}^{2}}}+{\frac {(y-y_{0})^{2}}{2\sigma _{Y}^{2}}}\right)^{P}\right)}$$

Parameter precision

Once one has an algorithm for estimating the Gaussian function parameters, it is also important to know how precise those estimates are. Any least squares estimation algorithm can provide numerical estimates for the variance of each parameter (i.e., the variance of the estimated height, position, and width of the function). One can also use Cramér–Rao bound theory to obtain an analytical expression for the lower bound on the parameter variances, given certain assumptions about the data.^[9][10]

1. The noise in the measured profile is either i.i.d. Gaussian, or the noise is Poisson-distributed.
2. The spacing between each sampling (i.e. the distance between pixels measuring the data) is uniform.
3. The peak is "well-sampled", so that less than 10% of the area or volume under the peak (area if a 1D Gaussian, volume if a 2D Gaussian) lies outside the measurement region.
4. The width of the peak is much larger than the distance between sample locations (i.e. the detector pixels must be at least 5 times smaller than the Gaussian FWHM).

When these assumptions are satisfied, the following covariance matrix K applies for the 1D profile parameters ${\displaystyle a}$, ${\displaystyle b}$, and ${\displaystyle c}$ under i.i.d. Gaussian noise and under Poisson noise:^[9] $${\displaystyle \mathbf {K} _{\text{Gauss}}={\frac {\sigma ^{2}}{{\sqrt {\pi }}\delta _{X}Q^{2}}}{\begin{pmatrix}{\frac {3}{2c}}&0&{\frac {-1}{a}}\\0&{\frac {2c}{a^{2}}}&0\\{\frac {-1}{a}}&0&{\frac {2c}{a^{2}}}\end{pmatrix}}\ ,\qquad \mathbf {K} _{\text{Poiss}}={\frac {1}{\sqrt {2\pi }}}{\begin{pmatrix}{\frac {3a}{2c}}&0&-{\frac {1}{2}}\\0&{\frac {c}{a}}&0\\-{\frac {1}{2}}&0&{\frac {c}{2a}}\end{pmatrix}}\ ,}$$ where ${\displaystyle \delta _{X}}$ is the width of the pixels used to sample the function, ${\displaystyle Q}$ is the quantum efficiency of the detector, and ${\displaystyle \sigma }$ indicates the standard deviation of the measurement noise. Thus, the individual variances for the parameters are, in the Gaussian noise case, $${\displaystyle {\begin{aligned}\operatorname {var} (a)&={\frac {3\sigma ^{2}}{2{\sqrt {\pi }}\,\delta _{X}Q^{2}c}}\\\operatorname {var} (b)&={\frac {2\sigma ^{2}c}{\delta _{X}{\sqrt {\pi }}\,Q^{2}a^{2}}}\\\operatorname {var} (c)&={\frac {2\sigma ^{2}c}{\delta _{X}{\sqrt {\pi }}\,Q^{2}a^{2}}}\end{aligned}}}$$

and in the Poisson noise case, $${\displaystyle {\begin{aligned}\operatorname {var} (a)&={\frac {3a}{2{\sqrt {2\pi }}\,c}}\\\operatorname {var} (b)&={\frac {c}{{\sqrt {2\pi }}\,a}}\\\operatorname {var} (c)&={\frac {c}{2{\sqrt {2\pi }}\,a}}.\end{aligned}}}$$

For the 2D profile parameters giving the amplitude ${\displaystyle A}$, position ${\displaystyle (x_{0},y_{0})}$, and width ${\displaystyle (\sigma _{X},\sigma _{Y})}$ of the profile, the following covariance matrices apply:^[10]

$${\displaystyle {\begin{aligned}\mathbf {K} _{\text{Gauss}}={\frac {\sigma ^{2}}{\pi \delta _{X}\delta _{Y}Q^{2}}}&{\begin{pmatrix}{\frac {2}{\sigma _{X}\sigma _{Y}}}&0&0&{\frac {-1}{A\sigma _{Y}}}&{\frac {-1}{A\sigma _{X}}}\\0&{\frac {2\sigma _{X}}{A^{2}\sigma _{Y}}}&0&0&0\\0&0&{\frac {2\sigma _{Y}}{A^{2}\sigma _{X}}}&0&0\\{\frac {-1}{A\sigma _{y}}}&0&0&{\frac {2\sigma _{X}}{A^{2}\sigma _{y}}}&0\\{\frac {-1}{A\sigma _{X}}}&0&0&0&{\frac {2\sigma _{Y}}{A^{2}\sigma _{X}}}\end{pmatrix}}\\[6pt]\mathbf {K} _{\operatorname {Poisson} }={\frac {1}{2\pi }}&{\begin{pmatrix}{\frac {3A}{\sigma _{X}\sigma _{Y}}}&0&0&{\frac {-1}{\sigma _{Y}}}&{\frac {-1}{\sigma _{X}}}\\0&{\frac {\sigma _{X}}{A\sigma _{Y}}}&0&0&0\\0&0&{\frac {\sigma _{Y}}{A\sigma _{X}}}&0&0\\{\frac {-1}{\sigma _{Y}}}&0&0&{\frac {2\sigma _{X}}{3A\sigma _{Y}}}&{\frac {1}{3A}}\\{\frac {-1}{\sigma _{X}}}&0&0&{\frac {1}{3A}}&{\frac {2\sigma _{Y}}{3A\sigma _{X}}}\end{pmatrix}}.\end{aligned}}}$$ where the individual parameter variances are given by the diagonal elements of the covariance matrix.