Optical System With Beam Propagation Extension

Abstract

An optical system with an optical beam propagation extension, having an input and an output for the optical beam. The system includes at least two optical reflection elements for reflection of the beam, arranged to extend the propagation of the beam by reflection on the reflection elements, and at least one optical beam transmission element arranged to be traversed at least twice by the optical beam in different directions during propagation of the optical beam in the optical system. The optical transmission element ensures an optical transformation of the optical beam each tim the optical beam passes through so as to correct the divergence thereof.

Description

BRIEF DESCRIPTION OF THE DRAWINGS

The invention can be better understood and other advantages and special features will appear on reading the following description, given by way of a non-limiting example, accompanied by the appended drawings, in which:

FIG. 1 shows a first optical system with beam propagation extension according to the prior art,

FIG. 2 shows a second optical system with beam propagation extension according to the prior art,

FIG. 3 shows an optical system of the type of FIG. 2 equipped with elements for correcting the divergence of the beam,

FIG. 4 shows a first alternative of the optical system according to the invention,

FIG. 5 shows a second alternative of the optical system according to the invention,

FIG. 6 shows a third alternative of the optical system according to the invention,

FIG. 7 shows a fourth alternative of the optical system according to the invention,

FIG. 8 shows a fifth alternative of the optical system according to the invention,

FIG. 9 shows a sixth alternative of the optical system according to the invention,

FIG. 10 shows a seventh alternative of the optical system according to the invention,

FIG. 11 shows the geometric principle of beam propagation in a system according to the invention,

FIG. 12 is an equivalent diagram of the propagation of the unfolded system of the invention,

FIG. 13 is a display chart,

FIG. 14 shows a mode of production of the invention,

FIG. 15 shows a specific application of an optical system according to the invention.

DETAILED DESCRIPTION OF SPECIFIC EMBODIMENTS

The principle of the beam propagation extension system according to the invention is based on the use of transmission optics having symmetries so as to correct the divergence of the beam, and bending mirrors so as to extend the propagation distances. The symmetries of the optic enable a beam to pass through it a number of times in different directions and thus ensure the compactness of the system.

FIG. 4 illustrates the principle use by this invention. The optic 20 used has a circular symmetry with respect to its centre. A beam 21 first passes through the lens 20, then is reflected a first time by a first mirror 20. The mirror 22 directs the beam toward a second mirror 23, which directs the beam toward the centre of the lens 20. As it is symmetrical, the second passage of the beam is equivalent to the first. By correctly choosing the distance between the mirrors and the lens, it is thus possible to correct the divergence while increasing the beam distance covered without increasing the bulk. The optical axes of the mirrors 22 and 23 are not collinear.

FIG. 5 shows a three-dimensional view of another alternative of the system according to the invention. This alternative uses two planar mirrors 32 and 33 with non-collinear optical axes and a spherical lens 30. In this case, the lens 30 alone allows for correction of the divergence of the beam 31.

FIG. 6 shows a three-dimensional view of yet another alternative of the system according to the invention. This alternative uses two cylindrical mirrors 42 and 43 with non-collinear optical axes and a cylindrical lens 40. In this case, the lens 40 corrects the divergence in a first direction and the mirrors 42 and 43 correct the divergence in the other perpendicular direction while reflecting the beam 41.

The system according to the invention becomes particularly advantageous when the number of mirrors increases. As the lens used is symmetrical, it is indeed possible to pass through it in a multitude of directions. FIG. 7 shows a system with 15 mirrors and a single lens. The system includes a part 50 having a cavity equipped with fifteen mirrors referenced 51 to 65 with non-collinear optical axes. The cavity also allows for the housing, in the central portion, of a lens (spherical or cylindrical) 66. Spherical lenses are preferred because they make it possible to correct the complete divergence of the beam (according to the two axes). A cylindrical lens, which corrects only the divergence according to one axis (that perpendicular to the axis of the lens), can be used for systems without size restrictions according to the axis of said cylinder. A light beam 67 enters the cavity as it is directed toward the mirror 51 after having passed through the lens 66. It is successively sent toward the other mirrors in ascending order of their references, passing through the lens 66 after two reflections. When the beam reaches the last mirror, mirror 65, it is reflected back on itself and repeats the path that it made previously, in the reverse direction. The beam then leaves the cavity through the place where it entered. It is easy to envisage a large propagation distance between the input and the output of the beam in spite of a reduced component surface and the use of a single optic. This example typically corresponds to the production of an extended cavity.

FIG. 8 shows a system including two subsystems 71 and 72 of the type of FIG. 7 arranged in cascade in a part 70. A beam 73 entering the subsystem 71 leaves said subsystem to be directed into subsystem 72 and leave the subsystem 72. The system of FIG. 8 can be used in the case of a transmission delay line.

FIG. 9 shows another application of this invention. In this application, the optical transmission and divergence correction element 80 (a spherical lens) is made of an active material. By active material, we mean a material capable of transmitting an optical wave in stimulated or spontaneous transmission under the effect of a pump. The system shown includes four mirrors referenced 81 to 84 with non-collinear optical axes. This propagation extension system is closed so as to produce a stable cavity. One of the reflection elements, the mirror 83, has a lower reflection coefficient than the others so as to enable the laser beam 85 to exit. An optical source 86 serves as a pump so as to excite the active material. An additional mirror 87 makes it possible optionally to increase the confinement of the pump beam 88 in the spherical lens 80. Each time it passes through the ball lens, the beam is amplified due to the interaction of the pump beam with the active material. This solution offers the advantage of a long cavity length with a long active beam passage length, while minimising the bulk.

Along the same lines, it is also possible to consider a system with mirrors, comprising an area made of an active material. Such a system is shown in FIG. 10. This system is designed so that the optical wave passes through the active material before being reflected. Suitable pumping then enables the transmission in this material to be stimulated. FIG. 10 shows a system with four mirrors, including three reflecting mirrors 91, 92 and 93 and a semi-reflective mirror 94 making it possible to extract the optical wave. The mirrors 91 to 94 are covered with a layer of active material, respectively 101 to 104. The pumping of the layers of active material 101 to 104 is obtained by pump diodes, respectively 111 to 114. The mirrors 91 to 94, with non-collinear optical axes, transmit the pump beam. The beam passes through the ball lens 90 twice.

FIG. 11 shows the geometric principle of propagation of the beam in a system according to the invention. The beam F is divided into primary segments M_nM′_n and secondary segments M′_nM_n+1. Mirrors with non-collinear optical axes are positioned at the ends of these segments on circle C with radius R. The centre O of the circle C is the origin of the orthonormal reference x, O, y. The radius R can correspond to an incident beam with a mirror of angle α. Therefore, if t_o is the angle at the origin and if t_n indicates the angle of the segment M_nM′_n with the axis x, the following can be written:

t _n =t _o+2 n α   (1)

If βn and β′n are the mirror angles at points M_n and M′_n, then:

β_n=t_n−(π+α)/2   (2a)

β′_n=t_n−(π−α)/2   (2b)

The cumulative distance of the primary and secondary segments is:

L _seg=2 R (1+|cos(α)|)   (3)

From point M₀ to point M′_N40 , the distance covered is therefore:

L _tot=2 NR (1+|cos(α)|)+2R   (4)

with R being the radius of the circle supporting the mirrors.

It is generally desirable to work with equidistant mirrors. This implies that for a given N, the segment M_NM′_N overlaps the segment M₀M′₀. We then have:

α=(k/N) π/2 with k ε Z   (5)

The secondary segment must not cross the spherical LS. Therefore, the following geometric condition can be defined:

R sin(α)>R₁   (6)

with R₁ being radius of the lens LS.

The optical system according to the invention is based primarily on the use of Gaussian beams often found in integrated optics. A simple case involves the following conditions:

first condition: the propagation distances remain equal between each passing through the lens,

second condition: the waist (i.e. the minimum radius of the beam) is positioned in the middle of each secondary segment.

According to Gaussian optics theory, the second condition means that the distances separating the object and image waist positions at the object and image focal points are equal. Therefore, the object and image waists have the same size, and the same optics work by magnification 1.

FIG. 12 shows an equivalent diagram of propagation of the unfolded system, in which the beam is rectilinear. The mirrors are represented by dotted lines, and the spherical lenses are represented by circles.

The lenses are separated by the distance L. It is geometrically demonstrated that:

L=2 R (1+|cos(α)|)   (7)

In addition, to satisfy the conditions of conjugation of Gaussian beams, we must have:

L=2 f [1±(πW₀²)/(fλ))²)^0,5]   (8)

With Wo being the size of the waist of the beam, f being the focal length of the lens and λ being the propagation wavelength. The focal of a ball lens of index n₁ and the diameter D₁ is:

F=D ₁ n ₁/(4(n₁−1))   (9)

It should be noted that the previous equations in condition (6) require a minimum deviation angle value of α given by the formula:

α_min=arcos((L²−D₁²)/(L²+D₁²))   (10)

FIG. 13 shows the different values of minimum angles α_min according to the diameter Di of the lens for different waist sizes (the index of the glass is 1.5 and the wavelength considered is 1.55 μm).

When parameterizing the system, it is necessary to make sure that the lens does not obscure the beam. Taking into account the size of the waist, the condition (6) is expressed more precisely by the inequality:

R sin (α)>R₁+W₀   (11)

It is also necessary for the size of the mirror to be greater than the size 2 W_M of the beam at its level. This size is given by the relation:

W _M =W ₀ [1+((2 R cos (α) λ)/(π W₀²))²]^0.5   (12)

The size of the mirrors is associated with the angle of deviation and the diameter of the circle supporting the mirrors. The number of segments N defined in the equation (5) must therefore verify:

N>π R/(2 W_M)   (13)

This last equation is to be calculated with the value α_min in the definition of W_M. It is also necessary to make sure that the tilt of the mirrors and their size does not obscure the beams reflected by neighbouring mirrors. For this, N must remain relatively low.

We will now provide an example of a possible configuration.

We will consider a ball lens with a diameter of 4 mm and a refraction index of 1.5. The propagation is produced at the wavelength 1.55 μm.

We are working with a waist of size w₀=30 μm. The equations (8), (9) and (10) give a minimum angle of deviation of 40.8°.

The equations (7), (8) and (12) give, for this minimum angle value, a mirror support radius:

R_min=3.1 mm

and a beam radius on the mirrors of:

W_M=82 μm.

The value N of the number of mirrors is limited to:

N=30.

An angle of deviation is chosen:

α=( 17/30) π/2=51°.

For this angle value, we finally have:

R=3.3 mm

L=10.76 mm

W_M=74.7 mm

L_tot=32 cm.

In this example, a surface component of less than 1 cm² allows for a propagation distance of 32 cm.

As the number of mirror reflections may be high, it is important that each angular deviation be produced with the greatest precision. Thus, in the previous configuration, an error of 0.01 degrees on the angle of the mirrors results in a shift of around 5 μm in the position of the output beam.

The embodiments of the system must therefore ensure the greatest possible angular precision. A preferred embodiment will therefore be one that implements lithographic mirrors.

The mirrors can then be produced directly by deep etching of a substrate according to the planes of the mirrors, or by moulding techniques. FIG. 14 diagrammatically shows a mould 121 and a moulded substrate 122. The mould has, in the negative portion, a cavity formed by the succession of mirror planes.

Another solution involves positioning the mirrors one by one on a substrate by gluing. The positioning must then be extremely precise.

The above description relates to an optical system allowing for the propagation of a beam over a large distance generally using a single optical transmission element. To do this, said transmission element must have specific properties of symmetry, and the beam must be directed frequently by mirrors arranged appropriately.

The previous description is particularly focused on the idea of a cavity. It is possible to produce, according to the invention, an optical cavity with a long length (around 1 metre) in a very limited space (on the order of the cm²). The applications of the invention therefore relate primarily to the use of cavities: lasers and interferometric sensors.

The invention has the special features of enabling, in a reduced space, a large propagation of a wave through the air (by opposition to propagation in an optical fibre in which the electromagnetic wave is confined in the silica). This structure can therefore be used for absorption sensor applications.

A typical example is the gas sensor. The presence of a gas in the atmosphere involves an increase in the absorption coefficient γ for certain specific wavelengths, specific to the gas in question.

An optical wave propagated over a distance L will be attenuated by a factor ρ:

ρ=e^−γL   (14)

The absorption measurement, and therefore the gas concentration, is done by measuring the factor ρ, the root of the ratio of the intensity of the signal transmitted l_t by the intensity of the original signal l₀ at the characteristic wavelength:

$\begin{array}{cc}\gamma =-\frac{\ln \left(\frac{I_t}{I_0}\right)}{2L}& \left(15\right)\end{array}$

The equation (14) shows that if γ is very low, long propagation lengths are necessary to be capable of measuring a significant factor ρ.

For γ˜0 (with ρ˜1) it is shown that the precision of measurement is inversely proportional to L:

$\begin{array}{cc}d\gamma =\frac{1}{L}d\rho & \left(16\right)\end{array}$

Depending on the type of gas to be detected, it is therefore important to be capable of having long propagation lengths. This need is often contradicted by the size restrictions of sensors. This invention provides a solution that satisfies both of these requirements simultaneously.

As mentioned above, the propagation length of the beam is given by the relation:

L _tot=2 NR (1+|cos(α)|)+2 R   (4)

This value also includes the propagation in the lens. To know the value of the length in the air, it is necessary to reduce the number of passages through the lens of diameter D₁:

L _air=2 N R (1+|cos(α)|)+2 R−N D₁   (17)

If we take the example given above in the folded configuration (a mirror is placed at the end of the path in order to send the beam back tot he input, case of FIG. 7), we have:

L_tot=64 cm, with D₁=4 mm and N=30: L_air=40 cm.

We therefore have a free propagation distance of 40 cm in a structure of 1 cm².

FIG. 15 shows an example of an application of the optical system according to the invention in an absorption sensor. An optical source 131 is first filtered by a filter 132 in order to select the significant wavelength(s) and the light beam transmitted is injected into a 50/50 optical fibre coupler 133. A half of the signal is received by the optical detector 134 and serves as a reference. The other half of the signal leaves toward the sensor 135 constituted by an optical system according to the invention. The sensor 135 is placed in the gas 136 of which the absorption value is to be measured. After propagation in the optical system 135, the signal is reflected in the input fibre and, after passing through the coupler 133, is received by the detector 137. The ratio of the signals of the detectors 134 and 137 makes it possible to measure the absorption value and therefore the concentration of gas.

Claims

1-9. (canceled)

10. An optical system with an optical beam propagation extension, having an input and an output for the optical beam, comprising: at least two optical reflection elements for reflection of the optical beam, and arranged to extend propagation of the optical beam by reflection on the optical reflection elements; andat least one optical transmission element for optical beam transmission,wherein the optical reflection elements have non-collinear optical axes,the optical transmission element is arranged to be traversed at least twice by the optical beam in different directions during propagation of the optical beam in the optical system, andthe optical transmission element ensures an optical transformation of the optical beam each time the optical beam passes through so as to correct divergence thereof.

11. An optical system according to claim 10, wherein the optical transmission element includes a ball lens and the optical reflection elements include planar mirrors.

12. An optical system according to claim 10, wherein the optical transmission element includes a cylindrical lens having an axis of symmetry, in which optical elements include cylindrical mirrors with an axis of symmetry perpendicular to an axis of symmetry of the cylindrical lens.

13. An optical system according to claim 10, wherein the optical transmission element is at least partially made of an optically active material.

14. An optical system according to claim 10, wherein at least one of the optical reflection elements includes an optically active material.

15. An optical system according to claim 10, wherein the optical reflection elements are arranged to propagate the optical beam first in a reflection direction, and then in a reverse direction, with an input and the output of the optical beam being coincident.

16. An optical system according to claim 10, wherein the optical system includes at least two basic optical systems arranged in cascade.

17. An optical system according to claim 10, wherein one of the optical reflection elements is semi-reflective so as to serve as an output for the optical beam.

18. A gas sensor of absorption measurement type, comprising: an optical system with beam propagation extension, wherein the optical system is an optical system according to claim 10.