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Optics Express

  • Editor: Andrew M. Weiner
  • Vol. 21, Iss. 7 — Apr. 8, 2013
  • pp: 8331–8341
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Manifestation of the Gouy phase in strongly focused, radially polarized beams

Xiaoyan Pang and Taco D. Visser  »View Author Affiliations


Optics Express, Vol. 21, Issue 7, pp. 8331-8341 (2013)
http://dx.doi.org/10.1364/OE.21.008331


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Abstract

The Gouy phase, sometimes called the focal phase anomaly, is the curious effect that in the vicinity of its focus a diffracted field, compared to a non-diffracted, converging spherical wave of the same frequency, undergoes a rapid phase change by an amount of π. We theoretically investigate the phase behavior and the polarization ellipse of a strongly focused, radially polarized beam. We find that the significant variation of the state of polarization in the focal region, is a manifestation of the different Gouy phases that the two electric field components undergo.

© 2013 OSA

1. Introduction

The phase anomaly is a measure of how the phase of a monochromatic, focused wave field differs from that of a non-diffracted, converging spherical wave of the same frequency. Since its first description by L.G. Gouy in the 1890s [1

1. L. G. Gouy, “Sur une propriété nouvelle des ondes lumineuses,” Comptes Rendus hebdomadaires des Séances de l’Académie des Sciences 110, 1251–1253 (1890).

, 2

2. L. G. Gouy, “Sur la propagation anomale des ondes,” Annales des Chimie et de Physique 6eséries24, 145–213 (1891).

], his namesake phase has been observed under a wide variety of circumstances. Recently investigated systems range from vortex beams [3

3. S. M. Baumann, D. M. Kalb, and E. J. Galvez, “Propagation dynamics of optical vortices due to Gouy phase,” Opt. Express 17, 9818–9827 (2009) [CrossRef] [PubMed] .

, 4

4. G. M. Philip, V. Kumar, G. Milione, and N. K. Viswanathan, “Manifestation of the Gouy phase in vector-vortex beams,” Opt. Lett. 37, 2667–2669 (2012) [CrossRef] [PubMed] .

] to fields of surface plasmon polaritions [5

5. W. Zhu, A. Agrawal, and A. Nahata, “Direct measurement of the Gouy phase shift for surface plasmon-polaritons,” Opt. Express 15, 9995–10001 (2007) [CrossRef] [PubMed] .

]. Surprisingly many different explanations for the physical origin of this remarkable effect have been suggested (see [6

6. T. D. Visser and E. Wolf, “The origin of the Gouy phase anomaly and its generalization to astigmatic wavefields,” Opt. Commun. 283, 3371–3375 (2010) [CrossRef] .

] and the references therein). Because of its crucial role in many applications such as mode conversion [7

7. M. W. Beijersbergen, L. Allen, H. E. L. O. van der Veen, and J. P. Woerdman, “Astigmatic laser mode converters and transfer of orbital angular momentum,” Opt. Commun. 96, 123–132 (1993) [CrossRef] .

], coherence tomography [8

8. G. Lamouche, M. L. Dufour, B. Gauthier, and J.-P. Monchalin, “Gouy phase anomaly in optical coherence tomography,” Opt. Commun. 239, 297–301 (2004) [CrossRef] .

], the tuning of the resonance frequency of laser cavities [9

9. T. Klaassen, A. Hoogeboom, M. P. van Exter, and J. P. Woerdman, “Gouy phase of nonparaxial eigenmodes in a folded resonator,” J. Opt. Soc. Am. A 21, 1689–1693 (2004) [CrossRef] .

], and interference microscopy [10

10. X. Pang, D. G. Fischer, and T. D. Visser, “A generalized Gouy phase for focused partially coherent light and its implications for interferometry,” J. Opt. Soc. Am. A 29, 989–993. (2012) [CrossRef] .

], the Gouy phase continues to attract attention.

When a beam of light is focused by a high-aperture system, the usual scalar formalism no longer suffices, and an analysis of the Gouy phase must then take the vector nature of the field into account. This has recently been done for strongly focused, linearly polarized beams [11

11. X. Pang, T. D. Visser, and E. Wolf, “Phase anomaly and phase singularities of the field in the focal region of high-numerical aperture systems,” Opt. Commun. 284, 5517–5522 (2011) [CrossRef] .

]. It was found that the Gouy phases of the three Cartesian components of the electric field exhibit quite different behaviors. Another example which requires a vectorial description is the focusing of radially polarized beams [12

12. K. S. Youngworth and T. G. Brown, “Focusing of high numerical aperture cylindrical-vector beams,” Opt. Express 7, 77–87 (2000) [CrossRef] [PubMed] .

, 13

13. R. Martínez-Herrero and P. M. Mejías, “Propagation and parametric characterization of the polarization structure of paraxial radially and azimuthally polarized beams,” Opt. Laser Techn. 44, 482–485 (2012) [CrossRef] .

]. Because of their intriguing properties, such as a relatively small focal spot size [14

14. R. Dorn, S. Quabis, and G. Leuchs, “Sharper focus for a radially polarized light beam,” Phys. Rev. Lett. 91, 233901 (2003) [CrossRef] [PubMed] .

], these beams are widely used in, for example, the probing of the dipole moment of individual molecules [15

15. L. Novotny, M. R. Beversluis, K. S. Youngworth, and T. G. Brown, “Longitudinal field modes probed by single molecules,” Phys. Rev. Lett. 86, 5251–5254 (2001) [CrossRef] [PubMed] .

], high-resolution microscopy [16

16. C. J. R. Sheppard and A. Choudhury, “Annular pupils, radial polarization, and superresolution,” Appl. Opt. 43, 4322–4327 (2004) [CrossRef] [PubMed] .

], trapping of strongly scattering particles [17

17. Q. Zhan, “Trapping metallic Rayleigh particles with radial polarization,” Opt. Express 12, 3377–3382 (2004) [CrossRef] [PubMed] .

, 18

18. T. A. Nieminen, N. R. Heckenberg, and H. Rubinsztein-Dunlop, “Forces in optical tweezers with radially and azimuthally polarized trapping beams,” Opt. Lett. 33, 122–124 (2008) [CrossRef] [PubMed] .

] and in dark-field imaging [19

19. D. P. Biss, K. S. Youngworth, and T. G. Brown, “Dark-field imaging with cylindrical-vector beams,” Appl. Opt. 45, 470–479 (2006) [CrossRef] [PubMed] .

]. A review is presented in [20

20. T. G. Brown, “Unconventional polarization states: Beam propagation, focusing, and imaging,” in Progress in Optics, E. Wolf, eds. (Elsevier, 2011), 56, pp. 81–129 [CrossRef] .

].

A first indication of the complicated phase behavior of focused, radially polarized beams was the observation that their wave spacing near focus is highly irregular [21

21. T. D. Visser and J. T. Foley, “On the wavefront spacing of focused, radially polarized beams,” J. Opt. Soc. Am. A 22, 2527–2531 (2005) [CrossRef] .

]. This was followed by a study of the Gouy phase of the longitudinal component of the electric field vector at the focal plane [22

22. H. Chen, Q. Zhan, Y. Zhang, and Y.-P. Li, “The Gouy phase shift of the highly focused radially polarized beam,” Phys. Lett. A 371, 259–261 (2007) [CrossRef] .

]. In the present paper, the Gouy phase of the total electric field vector, consisting of a radial and longitudinal component, is examined in the entire focal region. It is found that the strong changes in the shape and orientation of the polarization ellipse near focus is a consequence of the different Gouy phases that these two components undergo.

2. Focused, radially polarized fields

Consider an aplanatic focusing system L of focal length f with a semi-aperture angle α. The geometrical focus is indicated by O and is taken to be the origin of a Cartesian coordinate system (see Fig. 1). A monochromatic, radially polarized beam with angular frequency ω is incident upon the system. The electric and magnetic fields at time t at position r are given by the expressions
E(r,t)=Re[e(r)exp(iωt)],
(1)
H(r,t)=Re[h(r)exp(iωt)],
(2)
respectively, where Re denotes the real part. Such a field may be generated, for example, by the superposition of two, mutually orthogonally polarized, Hermite-Gaussian beams. In the remainder we will only be concerned with the electric field. If we assume that the entrance plane of the focusing system coincides with the waist plane of the beam, then the longitudinal component ez and the radial component eρ of the electric field at a point P = (ρ, z) in the focal region are given by the equations (first derived in [12

12. K. S. Youngworth and T. G. Brown, “Focusing of high numerical aperture cylindrical-vector beams,” Opt. Express 7, 77–87 (2000) [CrossRef] [PubMed] .

], but here we adopt the notation of [21

21. T. D. Visser and J. T. Foley, “On the wavefront spacing of focused, radially polarized beams,” J. Opt. Soc. Am. A 22, 2527–2531 (2005) [CrossRef] .

])
ez(ρ,z)=ikf0αl(θ)sin2θcos1/2θeikzcosθJ0(kρsinθ)dθ,
(3)
eρ(ρ,z)=kf0αl(θ)sinθcos3/2θeikzcosθJ1(kρsinθ)dθ,
(4)
where Ji is the Bessel function of the first kind of order i and k = ω/c, with c the speed of light in vacuum, is the wavenumber associated with frequency ω. Furthermore, l(θ) denotes the angular amplitude function
l(θ)=fsinθexp[f2sin2θ/ω02],
(5)
where ω0 is the spot size of the beam in the waist plane. Note that since the incident electric field has no azimuthal component and the configuration is invariant with respect to rotations around the z-axis, there is no azimuthal component of the electric field in the focal region. The position of an observation point may be indicated by the dimensionless Lommel variables u and v[23

23. B. Richards and E. Wolf, “Electromagnetic diffraction in optical systems, II. Structure of the image field in aplanatic systems,” Proc. R. Soc. London Ser. A 253, 358–379 (1959) [CrossRef] .

], namely
u=kzsin2α,
(6)
v=kρsinα.
(7)
Equations (3) and (4) can then be rewritten as
ez(u,v)=ikf20αsin3θcos1/2θeβ2sin2θeiucosθ/sin2αJ0(vsinθsinα)dθ,
(8)
eρ(u,v)=kf20αsin2θcos3/2θeβ2sin2θeiucosθ/sin2αJ1(vsinθsinα)dθ,
(9)
where
β=f/ω0,
(10)
denotes the ratio of the focal length of the system and the spot size of the beam in the waist plane.

Fig. 1 A high-numerical-aperture focusing system with an incident beam that is radially polarized.

It follows from Eqs. (8) and (9) that the field components obey the following symmetry relations:
ez(u,v)=ez*(u,v),
(11)
eρ(u,v)=eρ*(u,v).
(12)

3. Two Gouy phases

The Gouy phase δ is defined as the difference between the actual phase of the field and that of a (non-diffracted) spherical wave converging to the focus in the half-space z < 0 and diverging from it in the half-space z > 0 ([24, Sec. 8.8, Eq. (48)]). For each individual component of the electric field we therefore define a Gouy phase as
δz(u,v)=arg[ez(u,v)]sign(u)kR,
(13)
δρ(u,v)=arg[eρ(u,v)]sign(u)kR,
(14)
where R is the distance from the observation point to the geometrical focus, i.e.
kR=kz2+ρ2=1sinαu2sin2α+v2,
(15)
and sign(x) denotes the sign function
sign(x)={1ifx<0,1ifx>0.
(16)
For the longitudinal field component ez, one finds from Eqs. (8), (11) and (13) that the Gouy phase at two points that are symmetrically located with respect to the focus satisfies the relation
δz(u,v)+δz(u,v)=π(mod2π).
(17)
At the focus we have
δz(0,0)=π/2(mod2π).
(18)
For the radial field component eρ, it follows from Eqs. (9), (12) and (14) that the Gouy phase satisfies the symmetry relations
δρ(u,v)+δρ(u,v)=0(mod2π).
(19)
Even though eρ = 0 when v = 0, it is useful to study the behavior of δρ along a tilted ray through focus; for such a ray v ∝ |u|. Using the fact that for small arguments Jn(x) ∼ xn [25, p. 360] we find from Eq. (9) that along a tilted ray eρ ∼ −|u|. Hence
limu0δρ(u,v)=limu0δρ(u,v)=π(mod2π).
(20)

It is seen from Eqs. (8) and (9) that the electric field components are characterized by two parameters, namely the semi-aperture angle α, and the beam-size parameter β. These two parameters have a different effect on the Gouy phase behavior as we will now demonstrate.

On the central axis of the system (v = 0) only the longitudinal field component ez is nonzero. The Gouy phase pertaining to this component, δz, is shown in Fig. 2 for various values of the semi-aperture angle α. It is seen that the phase change of ez decreases as α increases. Unlike the π phase jump of the longitudinal component in linearly polarized fields [11

11. X. Pang, T. D. Visser, and E. Wolf, “Phase anomaly and phase singularities of the field in the focal region of high-numerical aperture systems,” Opt. Commun. 284, 5517–5522 (2011) [CrossRef] .

], the Gouy phase here is continuous at focus. Note that the longitudinal coordinate u is dependent on the value of the semi-aperture angle α [See Eq. (6)].

Fig. 2 The Gouy phase δz along the optical axis (v = 0) of the electric field component ez for selected values of the semi-aperture angle α (blue curve: α = 40°, red curve: α = 50°, olive curve: α = 60°). The beam-size parameter β = 3.

In Fig. 3 the Gouy phase δz is depicted for selected values of the beam-size parameter β. For a decreasing beam waist-size (ω0) the Gouy phase decreases as well. In these two figures, the negative or positive slope of the Gouy phase means that the wavefront spacings can be smaller or bigger than λ. This effect has been discussed in [21

21. T. D. Visser and J. T. Foley, “On the wavefront spacing of focused, radially polarized beams,” J. Opt. Soc. Am. A 22, 2527–2531 (2005) [CrossRef] .

].

Fig. 3 The Gouy phase δz along the optical axis (v = 0) of the electric field component ez for selected values of the beam-size parameter β = f/ω0 (green curve: β = 1, blue curve: β = 2, red curve: β = 3, olive curve: β = 4). The semi-aperture angle α = 60°.
Fig. 4 The Gouy phase of the longitudinal component ez (red curve) and that of the radial component eρ (blue curve) along an oblique ray through focus under an angle θ = 35°. Here α = 40° and β = 1.

4. The Gouy phase and the state of polarization

It is convenient to characterize the state of polarization of a two-dimensional field by the four Stokes parameters [24, Sec. 1.4]. For a beam propagating in the z-direction, these parameters are defined in terms of ex and ey. For a focused, radially polarized field the two non-zero components of the electric field are ez and eρ. It is natural, therefore, to define the Stokes parameters in this case in terms of these components rather than ex and ey[26

26. R.W. Schoonover and T.D. Visser, “Polarization singularities of focused, radially polarized fields,” Opt. Express 14, 5733–5745 (2006) [CrossRef] [PubMed] .

, 27

27. R. Martínez-Herrero and P.M. Mejías, “Stokes-parameters representation in terms of the radial and azimuthal field components: A proposal,” Opt. Laser Techn. 42, 1099–1102 (2010) [CrossRef] .

]. We thus define
S0=|ez|2+|eρ|2,
(21)
S1=|ez|2|eρ|2,
(22)
S2=2|ez||eρ|cosδ,
(23)
S3=2|ez||eρ|sinδ,
(24)
where δ = arg[ez] − arg[eρ] = δzδρ. The normalized form of these Stokes parameters, s1 = S1/S0, s2 = S2/S0, s3 = S3/S0, represents a point on the Poincaré sphere [28, p. 316], as shown in Fig. 5. On the northern hemisphere (s3 > 0), the polarization is right-handed (clockwise), whereas on the southern hemisphere it is left-handed (counter-clockwise). On both poles (s3 = ±1), the polarization is circular. On the equator (s3 = 0), the field is linearly polarized.

Fig. 5 The Poincaré sphere with Cartesian axes (s1,s2,s3) adapted for focused, radially polarized fields.

Along a ray through focus, which makes an angle θ with the z-axis, we have
v=|u|tanθ/sinα.
(25)
From Eqs. (11) and (12) it immediately follows that
|ez(u,v)|=|ez(u,v)|,
(26)
|eρ(u,v)|=|eρ(u,v)|.
(27)
These two relations are illustrated in Fig. 6. They also imply that the first Stokes parameter S0 is an even function in u. Using Eqs. (17) and (19), it is seen that
[δz(u,v)δρ(u,v)]+[δz(u,v)δρ(u,v)]=π(mod2π),
(28)
for the quantity δ, which is defined below Eq. (24), this implies that cos[δ(−u, v)] = −cos[δ(u, v)] and sin[δ(−u, v)] = sin[δ(u, v)]. Thus we find the following symmetry relations for the normalized Stokes parameters along a ray through focus:
s1(u,v)=s1(u,v),
(29)
s2(u,v)=s2(u,v),
(30)
s3(u,v)=s3(u,v).
(31)
An example is presented in Fig. 7. It is seen that S0, S1 and S3 are even, whereas S2 is odd.

Fig. 6 The normalized moduli of the longitudinal component ez (red curve) and that of the radial component eρ (blue curve) of the electric field along an oblique ray under an angle θ = 35° with the z-axis. Here we have chosen α = 40° and β = 1.
Fig. 7 The Stokes parameters along an oblique ray through focus which makes an angle θ = 35° with the z-axis (s1: blue curve, s2: red curve, s3: olive curve). Here α = 40° and β = 1.

The polarization ellipse may be characterized by two angular parameters (see Fig. 8). One is the orientation angle, ψ (0 ≤ ψ < π), which is the angle between the z-axis and the major axis of the polarization ellipse. The other is the ellipticity angle, χ (−π/4 ≤ χ < π/4). |tanχ| represents the ratio of the axes of the ellipse. The values ±π/4 correspond to circular polarization; whereas the value 0 indicates linear polarization. The sign of χ distinguishes the two senses of handedness, i.e., it is right-handed when χ > 0, and left-handed when χ < 0, see [24, Sec. 1.4]. The two angular parameters can be expressed in terms of the normalized Stokes parameters, as
ψ=12arctan(s2s1),
(32)
χ=12arcsin(s3).
(33)

From the symmetry relations of s1, s2 and s3, it is seen that
ψ(u,v)=πψ(u,v),
(34)
χ(u,v)=χ(u,v).
(35)

Two kinds of polarization singularities can occur. When the polarization ellipse is circular, the orientation angle ψ is undefined. This happens at so-called C-points. When the polarization is linear, the handedness is undefined. This occurs at so-called L-points. When a system parameter, such as the semi-aperture angle α, is varied in a continuous manner, these polarization singularities can be created or annihilated. This has been described in [26

26. R.W. Schoonover and T.D. Visser, “Polarization singularities of focused, radially polarized fields,” Opt. Express 14, 5733–5745 (2006) [CrossRef] [PubMed] .

, 29

29. D.W. Diehl, R.W. Schoonover, and T.D. Visser, “The structure of focused, radially polarized fields,” Opt. Express 14, 3030–3038 (2006) [CrossRef] [PubMed] .

].

The curves of the orientation angle ψ and the ellipticity angle χ along an oblique ray under angle θ = 35° are displayed in Figs. 9 and 10. In Fig. 9 it is seen that the orientation angle of the ellipse oscillates somewhat along the ray. Also, a C-point is seen near u = ±1.2, where the orientation angle ψ is singular. To the left of the C-point at u = −1.2, the polarization ellipse is slightly larger in the ρ-direction than it is in the z-direction. This situation is reversed to the right of that C-point. This coincides with a π/2 jump of the angle ψ. In Fig. 10, these C-points occur when the ellipticity angle χ takes on the value π/4. When χ equals 0, an L-point occurs, which happens near points such as u = ±2.9.

Fig. 8 Defining the angles ψ and χ of a polarization ellipse.
Fig. 9 The orientation angle ψ of the polarization ellipse along an oblique ray through focus under an angle θ = 35°. Here we have chosen α = 40° and β = 1.
Fig. 10 The ellipticity angle χ of the polarization ellipse along an oblique ray through focus under an angle θ = 35°. Here we have chosen α = 40° and β = 1.

Fig. 11 Illustration of the symmetry properties of the polarization ellipse. The electric field ellipse is shown at selected points along an oblique ray through focus. The ray is under an angle θ = 35°. Also, α = 40° and β = 1.

It is seen from Figs. 12, 13, and 14 that the evolution of the polarization ellipse can be quite different along different rays through focus. This behavior mirrors the different Gouy phases that the two components of the electric field vector undergo along these rays. In Fig. 12 (with θ = 10°) the handedness is clockwise at all observation points. This means that the Stokes parameter s3 > 0, i.e. δzδρ > 0. From Eq. (24) we see that this implies that the relative change of the two Gouy phases is limited along this ray. This is also the case for θ = 20°, as can be seen from Fig. 13. In that case, however, the ellipticity is considerably larger. If the obliquity angle θ is further increased to 30° (see Fig. 14), the polarization ellipses becomes even narrower. In addition, the handedness evolves from counter-clockwise to clockwise, reflecting the fact that δzδρ changes sign along the ray. Finally, the change in the orientation angle of the ellipses is seen to decrease significantly when the angle θ is increased.

Fig. 12 Polarization ellipse of the field at selected points along an oblique ray through focus. The ray is under an angle θ = 10°. Also, α = 40° and β = 1.
Fig. 13 Polarization ellipse of the field at selected points along an oblique ray through focus. The ray is under an angle θ = 20°. Also, α = 40° and β = 1.
Fig. 14 Polarization ellipse of the field at selected points along an oblique ray through focus. The ray is under an angle θ = 30°. Also, α = 40° and β = 1.

5. Conclusions

We have analyzed the phase behavior of strongly focused, radially polarized fields. We found that the Gouy phase of the two components of the electric field are quite different, and have different symmetries. Our results show that the semi-aperture angle α and the beam-size parameter β can both influence the Gouy phase. If we follow the polarization ellipse along a tilted ray through focus, it is seen to “tumble”, i.e., it changes its orientation, its shape and its handedness. This behavior is due to the different Gouy phases that the two components of the electric field undergo.

References and links

1.

L. G. Gouy, “Sur une propriété nouvelle des ondes lumineuses,” Comptes Rendus hebdomadaires des Séances de l’Académie des Sciences 110, 1251–1253 (1890).

2.

L. G. Gouy, “Sur la propagation anomale des ondes,” Annales des Chimie et de Physique 6eséries24, 145–213 (1891).

3.

S. M. Baumann, D. M. Kalb, and E. J. Galvez, “Propagation dynamics of optical vortices due to Gouy phase,” Opt. Express 17, 9818–9827 (2009) [CrossRef] [PubMed] .

4.

G. M. Philip, V. Kumar, G. Milione, and N. K. Viswanathan, “Manifestation of the Gouy phase in vector-vortex beams,” Opt. Lett. 37, 2667–2669 (2012) [CrossRef] [PubMed] .

5.

W. Zhu, A. Agrawal, and A. Nahata, “Direct measurement of the Gouy phase shift for surface plasmon-polaritons,” Opt. Express 15, 9995–10001 (2007) [CrossRef] [PubMed] .

6.

T. D. Visser and E. Wolf, “The origin of the Gouy phase anomaly and its generalization to astigmatic wavefields,” Opt. Commun. 283, 3371–3375 (2010) [CrossRef] .

7.

M. W. Beijersbergen, L. Allen, H. E. L. O. van der Veen, and J. P. Woerdman, “Astigmatic laser mode converters and transfer of orbital angular momentum,” Opt. Commun. 96, 123–132 (1993) [CrossRef] .

8.

G. Lamouche, M. L. Dufour, B. Gauthier, and J.-P. Monchalin, “Gouy phase anomaly in optical coherence tomography,” Opt. Commun. 239, 297–301 (2004) [CrossRef] .

9.

T. Klaassen, A. Hoogeboom, M. P. van Exter, and J. P. Woerdman, “Gouy phase of nonparaxial eigenmodes in a folded resonator,” J. Opt. Soc. Am. A 21, 1689–1693 (2004) [CrossRef] .

10.

X. Pang, D. G. Fischer, and T. D. Visser, “A generalized Gouy phase for focused partially coherent light and its implications for interferometry,” J. Opt. Soc. Am. A 29, 989–993. (2012) [CrossRef] .

11.

X. Pang, T. D. Visser, and E. Wolf, “Phase anomaly and phase singularities of the field in the focal region of high-numerical aperture systems,” Opt. Commun. 284, 5517–5522 (2011) [CrossRef] .

12.

K. S. Youngworth and T. G. Brown, “Focusing of high numerical aperture cylindrical-vector beams,” Opt. Express 7, 77–87 (2000) [CrossRef] [PubMed] .

13.

R. Martínez-Herrero and P. M. Mejías, “Propagation and parametric characterization of the polarization structure of paraxial radially and azimuthally polarized beams,” Opt. Laser Techn. 44, 482–485 (2012) [CrossRef] .

14.

R. Dorn, S. Quabis, and G. Leuchs, “Sharper focus for a radially polarized light beam,” Phys. Rev. Lett. 91, 233901 (2003) [CrossRef] [PubMed] .

15.

L. Novotny, M. R. Beversluis, K. S. Youngworth, and T. G. Brown, “Longitudinal field modes probed by single molecules,” Phys. Rev. Lett. 86, 5251–5254 (2001) [CrossRef] [PubMed] .

16.

C. J. R. Sheppard and A. Choudhury, “Annular pupils, radial polarization, and superresolution,” Appl. Opt. 43, 4322–4327 (2004) [CrossRef] [PubMed] .

17.

Q. Zhan, “Trapping metallic Rayleigh particles with radial polarization,” Opt. Express 12, 3377–3382 (2004) [CrossRef] [PubMed] .

18.

T. A. Nieminen, N. R. Heckenberg, and H. Rubinsztein-Dunlop, “Forces in optical tweezers with radially and azimuthally polarized trapping beams,” Opt. Lett. 33, 122–124 (2008) [CrossRef] [PubMed] .

19.

D. P. Biss, K. S. Youngworth, and T. G. Brown, “Dark-field imaging with cylindrical-vector beams,” Appl. Opt. 45, 470–479 (2006) [CrossRef] [PubMed] .

20.

T. G. Brown, “Unconventional polarization states: Beam propagation, focusing, and imaging,” in Progress in Optics, E. Wolf, eds. (Elsevier, 2011), 56, pp. 81–129 [CrossRef] .

21.

T. D. Visser and J. T. Foley, “On the wavefront spacing of focused, radially polarized beams,” J. Opt. Soc. Am. A 22, 2527–2531 (2005) [CrossRef] .

22.

H. Chen, Q. Zhan, Y. Zhang, and Y.-P. Li, “The Gouy phase shift of the highly focused radially polarized beam,” Phys. Lett. A 371, 259–261 (2007) [CrossRef] .

23.

B. Richards and E. Wolf, “Electromagnetic diffraction in optical systems, II. Structure of the image field in aplanatic systems,” Proc. R. Soc. London Ser. A 253, 358–379 (1959) [CrossRef] .

24.

M. Born and E. Wolf, Principles of Optics: Electromagnetic Theory of Propagation, Interference and Diffraction of Light, Seventh (expanded) edition, (Cambridge University Press, 1999).

25.

M. Abramowitz and I.A. Stegun, Handbook of Mathematical Functions with Formulas, Graphs, and Mathematical Tables (Dover, 1965).

26.

R.W. Schoonover and T.D. Visser, “Polarization singularities of focused, radially polarized fields,” Opt. Express 14, 5733–5745 (2006) [CrossRef] [PubMed] .

27.

R. Martínez-Herrero and P.M. Mejías, “Stokes-parameters representation in terms of the radial and azimuthal field components: A proposal,” Opt. Laser Techn. 42, 1099–1102 (2010) [CrossRef] .

28.

G.J. Gbur, Mathematical Methods for Optical Physics and Engineering (Cambridge University Press, Cambridge, 2011), pp. 91–93.

29.

D.W. Diehl, R.W. Schoonover, and T.D. Visser, “The structure of focused, radially polarized fields,” Opt. Express 14, 3030–3038 (2006) [CrossRef] [PubMed] .

OCIS Codes
(050.1960) Diffraction and gratings : Diffraction theory
(260.1960) Physical optics : Diffraction theory
(260.2110) Physical optics : Electromagnetic optics
(260.5430) Physical optics : Polarization

ToC Category:
Physical Optics

History
Original Manuscript: February 5, 2013
Revised Manuscript: March 19, 2013
Manuscript Accepted: March 21, 2013
Published: March 28, 2013

Citation
Xiaoyan Pang and Taco D. Visser, "Manifestation of the Gouy phase in strongly focused, radially polarized beams," Opt. Express 21, 8331-8341 (2013)
http://www.opticsinfobase.org/oe/abstract.cfm?URI=oe-21-7-8331


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References

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  26. R.W. Schoonover and T.D. Visser, “Polarization singularities of focused, radially polarized fields,” Opt. Express 14, 5733–5745 (2006). [CrossRef] [PubMed]
  27. R. Martínez-Herrero and P.M. Mejías, “Stokes-parameters representation in terms of the radial and azimuthal field components: A proposal,” Opt. Laser Techn. 42, 1099–1102 (2010). [CrossRef]
  28. G.J. Gbur, Mathematical Methods for Optical Physics and Engineering (Cambridge University Press, Cambridge, 2011), pp. 91–93.
  29. D.W. Diehl, R.W. Schoonover, and T.D. Visser, “The structure of focused, radially polarized fields,” Opt. Express 14, 3030–3038 (2006). [CrossRef] [PubMed]

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