Beam widths and diameters, D4-sigma method, 11 beam widths and diameters – SIGMA LBA-708 User Manual

The following equations describe the X and Y centroid locations from the collection of data points that

satisfy the above energy clip level criteria.

(

)

x centroid

X

z

z

=

Ч

∑

∑

(

)

∑

∑

Ч

=

z

z

Y

centroid

y

Where:

X

=

x

locations of selected pixels.

Y

=

y

locations of selected pixels.

z

= value of selected pixels.

6.11 Beam Widths and Diameters

To some extent, beam width is a term that describes how you have decided to measure the size of your

laser beam. The LBA-PC is designed to give you a set of measurement tools that will allow you to make

this measurement as you see fit. During the past few years there has been some movement toward a

consensus regarding a standard definition of beam width. This definition has grown out of laser beam
propagation theory and is called the Second Moment, or D-4-Sigma beam width. (The D erroneously

stands for Diameter.) Sigma refers to the common notation for standard deviation. Thus an X-axis

beam Width is defined as 4 times the standard deviation of the spatial distribution of the beam’s

intensity profile evaluated in the X transverse direction. Taken in the Y transverse direction will yield

the Y-axis beam Width.

Note: For a TEM

00

(Gaussian) beam, 2-Sigma is the 1/e² radius about the centroid.

The term Diameter implies that the beam is radially symmetric or circular in shape. The term Width
implies that the beam is non-radially symmetric, but is however axially symmetric and characterized by

two principal axes orthogonal to each other. Beams that are asymmetric, distorted, or irregularly

shaped will fail to give significantly meaningful or repeatable beam width results using any of the

standard methods.

6.11.1 D4-Sigma Method

From laser beam propagation theory, the Second Moment or 4-Sigma beam width definition is

found to be of fundamental significance. It is defined as 4 times the standard deviation of the energy
distribution evaluated separately in the X and Y transverse directions over the beam intensity profile.

d

x

x

σ

σ

= ⋅

4

d

y

y

σ

σ

= ⋅

4

Where:

d

σ

= The 4-Sigma beam width

σ

=

The standard deviation of the beam intensity

Operator’s Manual

LBA-PC

132