Self-steering partially coherent beams

Abstract

We introduce a class of shape-invariant partially coherent beams with a moving guiding center which we term self-steering partially coherent beams. The guiding center of each such beam evolves along a straight line trajectory which can be engineered to make any angle with the x-axis. We show that the straight line trajectory of the guiding center is the only option in free space due to the linear momentum conservation. We experimentally generate a particular subclass of new beams, self-steering Gaussian Schell beams and argue that they can find applications for mobile target tracing and trapped micro- and/or nanoparticle transport.

Introduction

Optical trapping is a powerful tool for manipulation of micro-particles or micro-targets. Since the seminal work of Ashkin¹ on trapping a particle through using radiation forces exerted by a Gaussian laser beam, the technique of optical trapping has been developed and is now widely applied in a variety of fields to manipulate micro-sized dielectric particles, cells, DNA and RNA molecules, neutral atoms, and living biological cells^2,3,4,5,6. At the same time, it is well established now that under certain conditions, partially coherent sources can generate highly directional light beams with the same far-field intensity distributions as do fully coherent laser beams^7,8. In this connection, it was found⁹ that partially coherent sources can give rise the same optical forces as those due to laser beams at any output plane of a generic ABCD optical system. Further, the same authors showed that partially coherent beams are superior to the laser beams in trapping biological samples because the former generate less thermal heating than the latter. To date, certain types of partially coherent beams have been shown to be especially beneficial in trapping neutral micro-particles^{10,11,12,13,14}.

In this paper, we demonstrate that the evolution of a beam guiding center position R_c (z), defined as

plays an important role in tracking and manipulating micro- and/or nanoparticles with partially coherent beams. In Eq. (1), W(ρ₁, ρ₂, z) is a cross-spectral density (CSD) of the beam field at a pair of points ρ₁ and ρ₂ in the transverse plane z.¹⁵. We notice that all partially coherent beams known to date have stationary guiding centers, which effectively precludes their use for transporting trapped particles. It is therefore instructive to explore the possibility of engineering shape-invariant partially coherent beams with mobile guiding centers which would enable one to transport trapped particles along prescribed trajectories. Such steering partially coherent beams can also find applications for tracing mobile military, meteorological and other targets.

We show how any shape-invariant partially coherent beam can be engineered into a self-steering one with its guiding center traveling along a straight line trajectory. The self-steering beam trajectory makes an angle with the x-axis that can be controlled by adjusting the beam phase at the source. We experimentally implement a subclass of new beams, self-steering Gaussian Schell (SSGS) beams and show that the lower the SSGS beam coherence the less susceptible the beam to speckle and/or spurious fringe formation on its propagation.

Results

Theory of self-steering partially coherent beams

We start by noticing that the intensity of any shape-invariant partially coherent beam is self-similar and can be related to the source intensity as¹⁶

where I₀[R] is the source intensity distribution, R ≡ (X, Y) is a dimensionless radius vector with X = x/σ_I and Y = y/σ_I, ρ ≡ (x, y) is a radius vector in the plane transverse to the beam propagation direction, σ_I denotes the beam waist, and σ(Z) is a propagation factor depending on beam intensity and coherence distributions at the source. We note that the intensity amplitude scaling in Eq. (2) guarantees beam power conservation,

According to the complex Gaussian representation¹⁷, the CSD of any partially coherent beam at the source can be expanded into a complete set of pseudo-modes as¹⁸,

Here P (α) is a nonnegative distribution function that guarantees non-negative definiteness of W and {Ψ_α(R, 0)} are the complex Gaussian pseudo-modes. Further, and α = (u + i v)/. The pseudo-modes {Ψ_α(R, 0)} are given by the expression

Consider now a shifted P− distribution such that

where P is the distribution of an original shape-invariant source. We will now demonstrate that this engineered partially coherent source gives rise to a self-steering shape-invariant beam.

Upon free-space propagation each pseudo-mode Ψ_α(R, 0) satisfies the paraxial wave equation which can be readily solved yielding^17,19,

where Z = z/z_R with , z being the propagation distance and k being the wavenumber. We stress here that Z is a normalized variable. The CSD in the Z plane can then be expressed as

It follows at once from Eqs (6) and (8) that the self-steering beam intensity, I_SG( R , z) ≡ W_SG( R, R , Z), is given by

Here

and the guiding center of each mode evolves according to R_α(Z) = u + Z v. Thus, the self-steering beam intensity can be viewed as an incoherent superposition of weighted Gaussian intensities with various guiding center positions. On substituting from Eq. (10) into (9), shifting the integration variables, and comparing with Eq. (4), evaluated at the same spatial point, one can see that the intensity profile of the beam is maintained up to a scaling factor such that

where R_c (Z) = u₀ + Z v₀ which proves our assertion that any shape-invariant source with a shifted P− distribution generates the corresponding self-steering beam. Our result is completely general, except we require the knowledge of both the intensity and coherence distribution at the source to determine the explicit form of the propagation factor σ(Z).

To illustrate our general results, we consider the familiar case of a Gaussian Schell model (GSM) source whose shifted P− distribution can be inferred from ref. 17 as

where P₀ is a nonnegative constant, and ζ_c = σ_c/σ_I is a coherence parameter, σ_c being the source coherence length. The CSD of any SSGS beam at the source can be obtained from Eq. (4) as

where I₀ is a peak intensity of the beam. The corresponding intensity of SSGS beam can be obtained from Eq. (9) in the form

which conforms to the general rule of Eq. (11) with the propagation factor Eq. (14) clearly shows that the linear phase shift v₀ induces self-steering properties during propagation.

In Fig. 1 we display the SSGS guiding center evolution. In our numerical simulations, we chose the following parameters: σ_I = 1 mm, σ_c = 10 mm, λ = 632.8 nm and u₀ = (0, 0). It can be inferred from Fig. 1 that the SSGS guiding center can be shifted to any point in the transverse plane of the beam by adjusting v₀. Thus an SSGS beam can serve as an effective tool for transferring a trapped particle to any desired location as well as for tracking a moving target.

Figure 1: Self-steering of novel beams in free-space.

(a) SSGS beam intensity distribution at several propagation distances for v₀ = (−2, 4). (b) SSGS beam intensity distribution at several propagation distances for v₀ = (0, 0). (c) SSGS beam intensity distribution at several propagation distances for v₀ = (3, −2).

Experimental generation of self-steering partially coherent beams

Next we show how to generate an SSGS source in practice. As follows from Eq. (13), the CSD of the SSGS source can synthesized by introducing a displacement u₀ and a linear phase shift v₀ to a conventional GSM source. Figure 2(a) shows a conventional optical system for generating the well-known GSM source, first reported in ref. 20. Figure 2(b) shows our optical system for generating an SSGS source with controllable parameters u₀ and v₀; the latter can be regarded as a modification of the former. In Fig. 2(b), a focused off-axis Gaussian beam with the electric field illuminates a rotating ground-glass disk (RGGD), followed by the output beam passing through a thin lens with the focal length f₂ and an off-axis Gaussian amplitude filter (GAF) with the transmission function producing an SSGS source. Here ρ₀ = (ρ_0x, ρ_oy) and ω₀ are the off-axis displacement and the beam waist of the incident Gaussian beam, respectively, r₀ = (x₀, y₀) is the off-axis displacement of the GAF transmission function. In accord with the van Cittert-Zernike theorem¹⁵, the CSD of the SSGS source in related to the intensity of the incoherent off-axis Gaussian beam (i.e., ) just behind the RGGD as

Figure 2

Schematics for generating (a) conventional Gaussian Schell-model source, and (b) self-steering Gaussian Schell source with controllable parameters u₀ and v₀; L₁ and L₂ thin lenses, rotating ground-glass disk (RGGD), Gaussian amplitude filter (GAF).

Here H( r , ρ ) is the response function of the optical system between the RGGD and the GAF given by^15,20,21,22

Substituting I(ρ) and Eq. (16) into Eq. (15), we find that the CSD of the SSGS source has the form of Eq. (13) with the parameters u₀ = r₀/σ_I and v₀ = 2πσ_Iρ₀/(λf₂). It follows that the displacement u₀ of the generated SSGS source is related to the off-axis GAF displacement r₀ and the linear phase shift v₀ is determined by the off-axis displacement ρ₀ of the incident off-axis Gaussian beam.

We carry out an experiment to generate and characterize the SSGS beam. In our experiment, the wavelength λ = 632.8 nm, the focal lengths of thin lenses L₁ and L₂ are equal to 100 mm and 200 mm, respectively, and the transverse beam width σ_I is equal to 1 mm. The off-axis displacement r₀ of the GAF is equal to (0, 0), therefore we generate an SSGS source with u₀ = (0, 0). The generated beam from the SSGS source first passes through a thin lens with the focal length f = 400 mm, and then arrives at a charge-coupled device (CCD), which measures the focused intensity. The distance between SSGS source and the CCD is equal to z. In our experiment, we generate several SSGS beams with different initial coherence widths to examine the coherence impact on the self-steering effect. The initial coherence width is modulated by the beam spot size at the RGGD. In particular, we generate three SSGS sources with the initial coherence widths σ_c = 1.0 mm, 0.5 mm and 0.2 mm, respectively. The experimental techniques for measuring the degree of coherence can be found in refs 23, 24, 25.

We display the experimental results in Fig. 3. Figure 3(a) shows the SSGS beam intensity distribution with the same v₀ = (5, 5) for different σ_c at several propagation distances, while Fig. 3(b) shows the same quantity for σ_c = 0.2 mm in the focal plane for different values of v₀. It can be inferred from Fig. 3 that the guiding center motion can be controlled by adjusting the linear phase shift v₀ at the source. We stress that although the apparent beam focusing in the figure is caused by the lens, the lens is not essential for beam self-steering. The latter results from the linear phase shift imparted to the beam at the source; the phase shift can be imprinted without a lens by using, for instance, a phase mask. The lens in our experimental setup serves primarily for convenience of imaging. To quantitatively ascertain the beam coherence width effect on the guiding center dynamics, visualized in Fig. 3(a), we present in Fig. 4 the SSGS beam guiding center position as a function of the propagation distance z for three values of coherence width (σ_c = 1.0 mm, σ_c = 0.5 mm, σ_c = 0.2 mm). We find that the initial coherence state of the beam has virtually no effect on its guiding center dynamics making our experimental results consistent with the theory, c.f., Eq. (14).

Figure 3: Experimental evidence of the beam guiding center evolution.

(a) SSGS beam intensity distribution at several propagation distances given the same v₀ = (5, 5) and different values of the initial coherence width. (b) Same as in (a) in the focal plane with σ_c = 0.2 mm and different values of v₀.

Figure 4

Guiding center position R_c as a function of the propagation distance z for three cases (σ_c = 1.0 mm, σ_c = 0.5 mm, σ_c = 0.2 mm) with the same v₀ = (5, 5).

Figure 5 shows a measured SSGS beam intensity distribution as the beam passes through a 2 × 2 circular hole array for three cases corresponding to different source coherence states. It is found from Fig. 5 that the higher the beam coherence the greater the intensity profile distortion due to speckles and spurious fringes, making SSGS beams of low coherence preferable for trapped particle transport/manipulations and mobile target tracing.

Figure 5

SSGS beam intensity distribution as the beam passes through a 2 × 2 circle hole array in three cases corresponding to different initial coherence widths.

Discussion

Finally, we show that the straight line guiding center trajectory is a generic property of any self-steering beams, either shape-invariant or not, rooted in the linear momentum conservation in free space. The simplest, and, perhaps, most elegant proof relies on the established analogy between paraxial beam propagation and Hilbert space time evolution of a quantum particle with the beam propagation distance being analogous to time; see, for instance refs 26 and 27. The coordinate and linear momentum of the equivalent quantum particle are analogous to the beam guiding center position angular spread, respectively. One can then show, following these references, that free space paraxial beam propagation is equivalent to free quantum particle evolution which conserves linear momentum. As a result, the beam guiding center position must be either static or evolve linearly with the propagation distance, implying a straight line trajectory.

In summary, we have introduced a class of partially coherent beams with their guiding centers propagating along straight line trajectories, controlled by the linear phase shift at the source. We generate the new beams experimentally and confirm all our theoretical predictions. The new beams are anticipated to find applications for trapped particle transport and mobile target tracing.