Optical pulling at macroscopic distances

Pulling enhanced by transverse isotropy

Consider a hypothetical 2D system that consists of a slab and a beam that are translationally invariant along one direction. By symmetry, light diffraction is limited to within the scattering plane, so the degrees of freedom for the light to diffract are reduced from 2 to 1. Then, among all possible scattering angles, a fraction of θ₀/π contributes to pulling, which is significantly better than the fraction of sin² θ₀/2 in a general 3D system at small θ₀. One may thus intuitively expect the OPF to be much more achievable in 2D in general. At θ₀ = 1^o, the pulling cone spans 5.6 × 10⁻³ out of all solid angles, which is more than 70 times larger than that of a 3D system, which is 7.6 × 10⁻⁵. However, the fraction is very small in either case; thus, pulling at θ₀ ≈ 1^o is not easy at all. Moreover, 2D systems, if not somewhat fictive, are very long in one dimension; thus, they are quite heavy and difficult to manipulated by light.

Here, we note that a system with transverse isotropy shares the advantages of a 2D system but not its disadvantages. Because a system consists of a particle and a beam that have transverse isotropy, the Poynting vectors of the incident and scattered fields have no azimuthal component; therefore, diffraction in the azimuthal direction is forbidden. Consequently, light propagating in the plane defined by a constant ϕ remains on that plane after being scattered. This, in a sense, mimics 2D diffraction.

The OPF is typically realized using a propagation-invariant beam, which, ideally, does not diffract as the beam propagates. Here, if not otherwise specified, we use the m = 0 azimuthally polarized Bessel beamE=−E0i exp(ik0 cos θ0z)J0′(k0 sin θ0ρ)sin θ0ϕ^(3)where k₀ is the background wave number, (ρ, ϕ, z) are the cylindrical coordinates, J0′ is the derivative of the zeroth-order Bessel function with respect to its argument, and the fixed half-cone angle θ₀ denotes the angle between the beam propagation direction (z^) and the wave vectors of the Fourier components of Eq. 3. Throughout this paper, unless explicitly stated, the incident wavelength is fixed at 532 nm. The normalization of the Bessel beam’s intensity is described in Materials and Methods.

Figure 2 plots the OPF acting on a spherical particle illuminated by different concentric beams, including the transversely isotropic m = 0 azimuthally polarized Bessel beam given in Eq. 3 (Fig. 2A), a transversely isotropic m = 0 radially polarized Bessel beam (Fig. 2B)E=E0 exp(ik0 cos θ0z)(icos θ0J0′(k0 sin θ0ρ)sin θ0ρ^+J0′(k0 sin θ0ρ)z^)(4)an m = 0 linearly polarized Bessel beam (Fig. 2C)E=E0 exp(ik0 cos θ0z)(cos θ0J0(k0 sin θ0ρ)y^−iyρsin θ0J0′(k0 sin θ0ρ)z^)(5)and a pair of copropagating plane waves (Fig. 2D)E=E0x^(eik0 sin θ0y+e−ik0 sin θ0y)eik0 cos θ0z(6)

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In terms of inducing the OPF, the azimuthally polarized beam given in Eq. 3, which is transversely isotropic, outperformed all others. The radially polarized beam was also transversely isotropic, but it was still expected to be less effective in pulling. The electromagnetic boundary conditions required the electromagnetic fields for the azimuthal polarization to be continuous across the particle boundary, resulting in less reflection, and thus, it had a stronger OPF. However, the electric field for the radial polarization was discontinuous, leading to stronger reflection; thus, it had a weaker OPF. That is, the difference in performance between the radial and azimuthal polarization was due to the asymmetry in permittivity and permeability distribution. We note that Fig. 2 also suggests that OPF depends not only on the type of beam but also on its polarization.

Figure 3 compares the optical force acting on a dielectric cylinder and two rectangular dielectric blocks with different aspect ratios. The incident beam was the Bessel beam given in Eq. 3. All particles had the same volume and length and were made from the same material. The OPF diminished with increasing aspect ratio of the rectangular blocks (red and blue dashed curves) as the particle shape deviated from transverse isotropy. A highly symmetric system places more restrictions on the light propagation; therefore, the light has a lesser degree of freedom to diffract, which is favorable for the OPF where strong forward scattering is required.

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Figures 2 and 3 highlight the importance of transverse isotropy in optical pulling. Although the magnitude of the pulling force was smaller than that of the pushing force, they were of the same order of magnitude. We also calculated the OPF acting on a spheroid (see section S1) induced by the Bessel beam given in Eq. 3. Its performance in the OPF was even better than that of a bare cylinder. The reflection from the flat ends of the cylinder was directly backward, generating strong forward forces, whereas that of the spheroid did not. The good performance of the spheroid further confirms the important role of transverse isotropy in optical pulling. For reasons to be discussed later, we still preferred working with the cylinder.

Pulling enhanced by Snell’s law

We went beyond transverse isotropy and considered a dielectric microcylinder of diameter D and length L, coated without (Fig. 4A) and with (Fig. 4D) ARC. To induce the OPF at a small θ₀, the particle must squeeze most of the scattered light into the tiny pulling cone. Apparently, this would not be possible if the scattering was strong, as light would be scattered everywhere. In Fig. 4B, the phase space region with the OPF is highlighted in blue for a bare glass cylinder without ARC in water and illuminated by the Bessel beam given in Eq. 3. Because the microcylinder had straight parallel sides and flat ends, light impinging on it reflected and diffracted approximately according to Snell’s law but with some slight deviation due to diffraction by the particle with finite size and finite curvature. Accordingly, by Snell’s law, all light was scattered into an angle near the edge of the pulling cone, i.e., θ = θ₀ + Δθ, where the small Δθ was induced by diffraction. It turns out that if one further excites the fundamental waveguide mode (FWM) by using a particle with an appropriate size, then Δθ < 0, which induces the OPF, as explained in the next section. Here, at each θ₀, we chose a diameter D such that the FWM was excited. The relationship between D and θ₀ is plotted in Fig. 4G, which can be written down analytically for small θ₀D(θ0)≈2z1/kbθ0(7)

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Here, z₁ is the first zero of the first-order Bessel function. Inducing the OPF at small θ₀ is possible only with a large D owing to the diffraction limit. Further details on the FWM and the derivation of Eq. 7 can be found in section S2. We must stress that the excitation of the FWM is by no means a requirement for the OPF, although it can be an advantage sometimes. The FWM can be effectively excited only for θ₀ less than some critical value, and the OPF for θ₀ outside this range is not plotted on the figures. The OPF exists for θ₀ > 30^o. A larger θ₀ has a larger pulling cone; therefore, it is more likely for the scattered light to induce the OPF. When θ₀ is small (<30°), the OPF almost disappears completely because of the strong reflection by the flat end of the cylinder. The optical force versus L when θ₀ = 2^o is plotted in Fig. 4C. We observed some periodically spaced peaks, which can be attributed to the Fabry-Perot resonances.

Pulling enhanced by ARCs

To further improve the OPF, we noted that backscattering generated a strong forward force. For particles with flat ends, such as a cylinder, ARCs may be applied on its ends to reduce or even completely eliminate reflection. We noted that ARC was also adopted in (28, 60–62) to improve the performance of the optical force and the OPF. Our ARCs were characterized by a refractive indexnARC=npnb(8)and a thicknessd(θ0)=λ cos θARC4nARC−4nb sin θ0 sin θARC(9)where θ_ARC = sin⁻¹(n_b sin θ₀/n_ARC). The coating described by Eqs. 8 and 9 ensured that the reflected waves from the two boundaries of the coating would interfere destructively. The reflection was completely eliminated at normal incidence and partially eliminated at oblique incidence. A discussion on the tolerance and robustness of OPF with respect to the ARC thickness and its nonuniformity is given in section S5. That is, in typical cases, the OPF survives for nonuniformity in ARC thickness up to several tens of nanometers. The configuration considered in Fig. 4E is the ARC-coated version of Fig. 4B, and its geometry is illustrated in Fig. 4D. After coating, the phase space area with the OPF expanded considerably, especially for small L and small θ₀, where the ARC worked best. Figure 4F plots the optical force versus L when θ₀ = 2^o for the ARC-coated cylinder. The Fabry-Perot resonances observed in Fig. 4C were eliminated by the ARC as the light could no longer bounce back and forth. The reduced reflection also uniformly shifted the force toward negative values as compared to the uncoated case. We observe two dips at L = 0.9 μm and L = 2.9 μm in Fig. 4F. The force oscillated with L with a period Δ = λ/(n_p − n_b) ≈ 2 μm owing to the interference structure (63). There was no OPF for long particles when θ₀ was small. Consider the light rays that go into the cylinder from the curved side surface and go out through the flat end. According to Snell’s law, if these light rays enter with an angle of θ₀ = 2^o, they will exit with an angle of θ_out ≈ 42^o, which generates strong forward forces. The longer the particle is, the more it is affected and therefore the less likely for the OPF to exist. The angular distributions of the scattered field when θ₀ = 2^o for different cylinder lengths are shown in Fig. 4I and marked as different colored arrows in Fig. 4F. First, we note that the peaks of all the scattered fields were located nicely inside the pulling cone, which was due to the collimation effect induced by interference, to be discussed in the next section. Second, there was a non-negligible scattered field at the direction θ ≈ 42^o, which was due to the light entering from the curved side.

We remark that a cylinder made from impedance-matched metamaterials, such as those with ε_r = n_pn_b and μ_r = n_p/n_b (64–66), was able to replace the ARC-coated cylinder. This outcome was equally good, as shown by the red curve in Fig. 4F.

Pulling enhanced by collimation due to interference

The angular distribution of the scattered light plotted in Fig. 4I shows a scattering peak located within θ < 2^o. The exit end of the cylinder can be approximately treated as a circular aperture (67), where the plane wave–like guided light diffracts upon exit. Because Snell’s law is approximately satisfied for the flat ends and the straight parallel curved sides of the microcylinder, the field scattered by an ARC cylinder approximately preserves the light propagation angle such that θ ≈ θ₀ for nearly all scattered light. However, the interference between different Fourier components of the light induces a shift in θ toward 0°. To see this, consider a circular aperture (i.e., the exit end of the cylinder) illuminated uniformly by a plane wave propagating along (θ₀, ϕ₀ = 0) and polarized along ϕ^=y^; on the ϕ = 0 plane (i.e., xz-alnbe), the diffracted wave is (67, 68)Ediff,+θ0(r,θ,ϕ=0)=y^ieikrra2cos θE0J1(ka(sin θ−sin θ0))ka(sin θ−sin θ0)(10)where a = D(θ₀)/2. According to Eq. 10, for a single plane wave, the angular distribution peaks at θ ≈ θ₀, as expected from Snell’s law. However, if one considers adding a second plane wave, which is identical to the first one except ϕ = π, the total diffracted field will beEdiff(r,θ,ϕ=0)=Ediff,+θ0(r,θ,ϕ=0)+Ediff,−θ0(r,θ,ϕ=0)=y^ieikrra2cos θE0(J1(ka(sin θ−sin θ0))ka(sin θ−sin θ0)−J1(ka(sin θ+sin θ0))ka(sin θ+sin θ0))(11)

One can observe from Fig. 5 that the peak scattering angle (θ_SP) shifts from θ_SP = θ₀ to θ_SP < θ₀ after interference. Consider the black line shown in Fig. 5, which shows the scattered field distribution for a plane wave with θ₀ = 2^o. The angular distribution of the corresponding scattered field also peaks at θ = 2^o. However, after it interferes with the red line induced by the second plane wave with θ₀ = −2^o, because the central maximum of the diffracted light is twice as wide as the higher-order resonances, the θ < 2^o side of the black curve interferes constructively, whereas the θ > 2^o side interferes destructively. As a result, the peak θ_SP shifts into the pulling cone where |θ| < 2^o, which collimates the wave and contributes to OPF. We note that the shifting of θ_SP by our model with two plane waves was ~0.3°, whereas the shift for the Bessel beam shown in Fig. 4I was ~0.5°. The plane waves were not transversely isotropic, so their performance was not expected to be as good as that of the Bessel beam. More details about the interference of the diffracted fields can be found in section S3.

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Robustness of OPF

The excellent performance of the OPF was based on several independent yet compatible mechanisms working in tandem. First, the transverse isotropy, cylindrical geometry of the system, and ARC ensured that θ ≈ θ₀; then, the interference of FWM collimated the beam, which induced the OPF, as delineated in Fig. 1 (A to E). Figure 6A shows a transversely isotropic but otherwise irregular particle illuminated by the Bessel beam given in Eq. 3. It consists of a cylindrical core (yellow), plus an additional subwavelength-sized structure whose size was less than 100 nm (purple), and ARC (green) covering the flat ends of the cylinder but not the additional structure. Figure 6 (B and C) plots the forces when the refractive indices of the additional structures (purple) are n₃ = n_p = 1.6 and n₃ = 2.0, respectively. The OPF tolerated the existence of the additional structures when n₃ = n_p = 1.6. For n₃ = 2.0, the OPF was weakened. In all cases, the weakening of the OPF was mainly due to the reflection by the additional structures.

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We also tested the tolerance of the OPF against θ₀, incident wavelength, and material absorption, as shown in Fig. 6 (D to F). The nonresonance-based OPF had good tolerance in the converging angle, which was ± 5^o about the central angle at θ₀ = 30^o, as shown in Fig. 6D. In addition, the OPF had a relatively broad frequency band (~50- to 100-nm bandwidth), as shown in Fig. 6E. The optical forces versus L at different absorption levels in the dielectric constant of the particle were also investigated, and the results are shown in Fig. 6F. When Im(n_p) = 0.0005, the absorption was noticeable only for particles longer than 4 μm because the longer the particle is, the more it absorbs. This degrades the OPF in two ways. First, it directly induces forward forces as light momentum is absorbed. Second, it indirectly reduces the amount of light available for generating a recoil force. When Im(n_p) = 0.0050, OPF was observed only for short particles with lengths under ~ 1.3 μm. We remark that unlike high dielectrics, which are often associated with absorption, lower dielectric materials, such as those adopted by us here, can have small absorption. Among others, glass is an excellent example.