In the field of optics and electromagnetic wave propagation, the "transmission matrix" is a fundamental concept used to describe the behavior of optical systems, particularly in the context of paraxial optics. The transmission matrix allows us to understand how an optical system transforms the input optical field into the output optical field.
An optical system can be represented by a set of optical elements (such as lenses, mirrors, prisms, etc.) arranged in a specific order. The transmission matrix relates the input complex amplitude distribution of the optical field to the output complex amplitude distribution in a compact matrix form.
The transmission matrix is typically represented by a 2x2 matrix and can be denoted as follows:
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| A B |
| C D |
Each element of the matrix (A, B, C, and D) is related to the behavior of the optical system and can be determined by the properties of the individual optical elements comprising the system. The matrix elements have a direct relationship with the ABCD parameters, also known as the ray transfer matrix or simply the "ABCD matrix."
The ABCD parameters of an optical element describe how the element affects the propagation of paraxial rays (rays close to the optical axis) passing through it. For different optical elements, the ABCD parameters can be calculated. Here is how they are related to the transmission matrix:
A-parameter (Matrix element A): Describes the effect of the optical element on the amplitude and phase of the rays near the optical axis in the input plane.
B-parameter (Matrix element B): Describes the effect of the optical element on the amplitude and phase of the rays near the optical axis in the input plane, with respect to the lateral (transverse) position of the rays.
C-parameter (Matrix element C): Describes the effect of the optical element on the amplitude and phase of the rays near the optical axis in the output plane.
D-parameter (Matrix element D): Describes the effect of the optical element on the amplitude and phase of the rays near the optical axis in the output plane, with respect to the lateral (transverse) position of the rays.
To calculate the overall transmission matrix of an optical system consisting of multiple elements in series, you can simply multiply the individual transmission matrices of each element from left to right. For example, if you have two optical elements represented by their respective 2x2 matrices, M1 and M2, the overall transmission matrix of the system would be:
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M_total = M2 * M1
By knowing the transmission matrix of an optical system, you can easily predict the output field for a given input field and analyze the system's overall performance, including parameters such as beam size, divergence, and focus position. The concept of the transmission matrix and ABCD parameters is widely used in the design and analysis of optical systems, particularly in laser optics, fiber optics, and imaging systems.