Introduction

Confining light and high-frequency sound waves in micron- to nanometre-scale structures, such as planar microcavities1, 2, micro-tori3, micro-ladders4, photonic crystal fibres5, nanorings6, nanovoids7 or nanoparticles8 promises enhanced interaction and control of light, with wide-ranging applications in cooling, sensing, optical modulation, frequency conversion or amplification. Time-resolved studies are of particular interest1, 2, 6, 7, 8 as they yield information on the progression of acoustic pulses through the structure, thus allowing the probing of its interior. Picosecond acoustic pulses passing through microcavities or quantum wells1, 9 have revealed, for example, the dynamics of carrier quantum-state coupling to resonant photons or polaritons, allowing new avenues for acousto-optic modulation to be explored.

Viewing the success of megahertz (MHz) acoustic pulses in resolving millimetre-scale structures and subsequent extension to gigahertz (GHz) imaging on micron scales10, it is natural to ask the question: can three-dimensional (3D) focused acoustic probing of a sub-micron structure be carried out? Steps in this direction have been made by wavefront imaging of GHz acoustic waves11, 12 or by measuring acoustic echoes in microscopic spheres and cylinders13, 14, as well as free-standing nanowires15, 16, 17, 18, but it has not been possible to continuously follow the passage of focused acoustic waves in sub-micron-sized 3D objects, and thereby probe spatially resolved acoustic–optic interactions inside them in real time. In this paper, we combine the technique of generating coherent acoustic waves on curved surfaces with a time-domain Brillouin scattering technique to demonstrate the continuous optical tracking of focused GHz coherent phonon pulses in single silica fibres of radius down to ~400 nm as well as the detection of their GHz vibrational modes. An analytical model, supported by 3D simulations, suggests that we have focused a ~40-GHz acoustic beam to a spot ~150 nm in diameter.

Materials and methods

The sample is a tapered silica fibre of refractive index n=1.47 made by drawing a heated sample19, with core and cladding diameters 4.4 and 125 μm, respectively, in the undrawn fibre (single-mode fibre, Nufern 780-HP). The outer fibre radius increases gradually from 390 nm in the middle of the fibre length to several micrometres over a fibre length of ~0.1 m. For the purposes of local acoustic measurements on different parts of the fibre, the effect of the taper is negligible. An aluminium film of thickness d=30 nm is sputtered on one side of the fibre for acoustic transduction. The difference in optical and mechanical properties of the core and cladding can be neglected.

We use an optical pump-probe technique, shown schematically in Figure 1a. Trains of optical pulses (wavelength 800 nm, pulse duration 200 fs, energy 0.1 nJ and repetition frequency 81 MHz) are used as a pump. They are focused onto the metal-coated side of the fibre at normal incidence through a 100 × objective lens (numerical aperture=0.95) to a circular Gaussian spot of diameter 2Wpp≈1.6 μm (at 1/e2 intensity), with the optical polarization parallel to the fibre axis. The pump beam is chopped at 1 MHz for lock-in detection. Each pump pulse produces a transient lattice temperature rise of ~200 K (there is also a steady-state temperature rise of ~50 K, with heat loss mainly occurring in the Al film) and a thermoelastic expansion of the Al film that launches longitudinal coherent phonon wave packets and triggers fibre vibrations. The small acoustic-strain-pulse reflection coefficient ~0.13 at the Al/SiO2 interface (see Supplementary Information for physical properties) ensures efficient transmission to the fibre. A broadband excitation spectrum containing frequencies up to ~150 GHz and with strain amplitudes ~5 × 10−3 is obtained.

Figure 1
figure 1

Experimental setup, and the acoustic and optical profiles for fibre radius Rf=1150 nm based on Gaussian beam theory. (a) Sample and setup. (b) Theoretical optical probe (blue) and acoustic-strain (red) 1/e2 beam radii (wE(x) and wA(x), respectively) as a function of propagation distance x (over the region from the front surface of the fibre to the back) calculated from Gaussian-beam theory for a fibre of radius Rf=1150 nm. (The dashed line indicates the position of the centre of the fibre.)

For illustration, the calculated bipolar spatial form of the generated coherent phonon strain pulse initially launched into the fibre is shown in the inset of Figure 2. This strain pulse shape is obtained by considering the effect of the ultrafast diffusion of optically excited electrons in the Al film with a one-dimensional two-temperature model20, 21, 22, 23. (Acoustic diffraction in 3D can be neglected for the propagation distances under consideration.) The nonlinear equations are solved numerically by the finite-difference time-domain method to obtain the spatiotemporal evolution of the electron and lattice temperatures (see parameters in Supplementary Information). The lattice temperature change generates the strain by thermal expansion, and the longitudinal strain field is calculated before transmission to the silica. Standard equations for acoustic-strain transmission then yield the spatial strain-pulse shape in the silica. The slight bump on the trailing (left-hand) side of the strain pulse is caused by acoustic reverberation inside the Al film due to the above-mentioned small strain reflection coefficient at the Al/SiO2 interface. Nonlinear effects arising from the two-temperature model are significant in this calculation, leading to a rounding effect on the acoustic pulse shape. Thermal conduction to the relatively poorly conducting silica is ignored.

Figure 2
figure 2

Optical reflectivity changes measured at three different locations on the fibre. Upward arrows indicate acoustic echoes. Inset: calculated strain pulse in the fibre just after leaving the Al film, where x is the radial coordinate measured in the direction from the excited surface to the centre of the fibre.

The optical reflectivity change δR(t) is measured as a function of pump-probe time delay t with frequency-doubled circularly polarized probe pulses (wavelength λ=400 nm and energy 40 pJ). The probe is focused coaxially with the pump to a spot of diameter 2Wpb≈0.8 μm (at 1/e2 intensity) on the fibre. In practice, optical alignment was achieved by searching for the maximum detected ultrafast probe-beam intensity modulation. Owing to the small radius of curvature of the fibre, the reflected probe beam is strongly divergent; we measure an up to ~90% clipping of this beam by the finite apertures of the objective, allowing detection enhancement through a defocusing effect13. In addition, given the refractive indices of Al, 0.52+5.0i, and of silica, 1.47, at 400 nm, ~5% of the probe-beam intensity penetrates through the Al coating24. This enables the continuous photoelastic probing of the acoustic amplitude inside the transparent fibre. The experimental technique is largely based on the standard methods of picosecond ultrasonics25, 26, 27. However, probing the passage of focused acoustic waves in sub-micron-sized 3D objects, such as our fibre sample, has never been attempted.

Results and discussion

Time-domain results

We plot δR(t) in Figure 2 for three different points along the tapered fibre axis, corresponding to radii Rf=435, 600 and 1150 nm. A sharp spike at t=0 arises from electron excitation and strain generation in the Al coating. This is followed by a longer-timescale overall thermal decay. Owing to generation on a curved surface, the fibre acts as a converging cylindrical lens and focuses the coherent longitudinal acoustic phonon pulses inside it. These pulses are transmitted into the fibre and are reflected back from the opposite surface; on returning to the Al layer, they produce echoes (indicated by the upward arrows in Figure 2). The radii Rf=vlΔt/4 can be determined from the time interval Δt between two successive echoes, using the known longitudinal sound velocity in silica, vl=5970 m s−1 (ref. 24). Brillouin oscillations26, 28, 29 at frequency fB≈44 GHz are clearly observable in the time domain for all the investigated positions on the tapered fibre. At the time when the phonon pulse reaches the back of the fibre wall, the oscillations show an approximate symmetry point owing to the acoustic reflection, as discussed in further detail below. There are also evident lower frequency contributions to δR, particularly clear for the case of Rf=435 nm. These arise from vibrational modes of the cylindrical cross section of the fibre.

Vibrational modes and Brillouin scattering

Figure 3 shows the normalized Fourier spectra of δR(t), indicating the presence of several vibrational modes. We have selected modes (downward arrows in Figure 3) that are common to two or more radii at frequencies fV=4.3, 9.6 and 24.1 GHz for Rf=435 nm, at 3.2, 7.0 and 17.8 GHz for Rf=600 nm, and at 1.7 GHz for Rf=1150 nm. The product fVRf is shown in the inset on a log scale as a function of Rf. We compare these results with the frequency of vibrations with mode numbers (m,l) obtained from the elastic wave equation30 for a homogeneous isotropic silica cylinder (horizontal dashed lines in the inset) using literature values (density ρ=2.2 g cm−3 and sound velocities vl=5970 m s-1 and vt=3760 m s−1 (ref. 24)). The pump-beam spot and investigated fibre diameters are of the same order of magnitude, so we neglect the effect of acoustic-wave propagation along the cylinder axis. We identify a breathing mode (0,0), a whispering gallery mode (1,2) and a higher-frequency mode that is not uniquely assignable owing to mode overlap. The vibrational bandwidths (~0.5 GHz) are largely determined by the finite time window (1.5 ns) for the data acquisition.

Figure 3
figure 3

Experimental Fourier spectra. Fourier (modulus) spectra corresponding to Figure 2. Inset: measured (dots) and calculated (dashed lines) normalized vibrational frequencies on a log scale in fVRf (measured in km s−1) vs fibre radius.

The Brillouin oscillations arise from the interference between the light scattered from the strain pulse inside the fibre and that reflected by the front surface of the fibre26, 28. These oscillations are governed by optical scattering from phonons of wavelength λA=λ/(2n)=136 nm. The exact form of the strain pulse does not affect the evolution of the Brillouin oscillations, which occur at a quasi-single frequency. The measured frequency fB=44 GHz from the Fourier spectra of Figure 3 is in excellent agreement with the equation fB=vl/λA, which applies for normal optical incidence, using known values of λ, n and vl (ref. 24). On increasing the fibre radius Rf, δR(t) exhibits an increasing contribution from Brillouin scattering as well as a decreasing contribution from the vibrational modes, the latter effect presumably arising because of the decreasing probe-beam clipping. No phase change in the Brillouin oscillations is observed as the phonon pulse passes through the acoustic focus near the centre of the fibre. Although a Gouy phase shift in the acoustic strain of π/2 is predicted for transmission through a cylindrical focus31, the observed Brillouin oscillations in optical probe-beam reflectivity depend on the complex 3D photoelastic interaction, and there is no simple prediction for the phase shift. We describe below how the Brillouin oscillations can be used to continuously monitor the acoustic propagation inside the fibres.

Time–frequency analysis

To better resolve the different contributions to δR(t), we perform a short-time Fourier transform (STFT) for the Rf=600 and 1150 nm data. This analysis is not done for Rf=435 nm owing to the dominant contribution of the vibrational modes. The use of Hamming windows (of FWHM (full-width at half-maximum) 190 and 300 ps, respectively) minimizes the vibrational-mode contribution. Respective STFT images are shown in Figure 4a and 4b. In both cases, a greater amplitude is observed at fB≈44 GHz (vertical dashed lines), and also at 0.4 and 0.8 ns (lower horizontal dashed lines) at the times of the respective first echoes. Similar features for the second echoes are, respectively, observed at 0.8 and 1.6 ns (higher horizontal dashed lines). The dips in the response at these times ~44 GHz can be attributed to the phonon pulse transmission from the fibre through the Al film towards its mechanically free surface and back. At low frequencies for Rf=600 nm, there also exists a strong, long-lived feature from the cylinder breathing mode.

Figure 4
figure 4

STFT data. STFT images of δR and sections measured for (a) radius Rf=600 nm (Hamming window of FWHM 190 ps), and (b) Rf=1150 nm (window of 300 ps).

For the case of Rf=600 nm (and 1150 nm), we plot the spectra at the times of the first and second echoes at 0.4 and 0.8 ns (and 0.8 and 1.6 ns), corresponding to sections along the horizontal lines in the STFT image in Figure 4a and 4b. The second-to-first echo ratio rac yields the frequency-dependent round-trip attenuation coefficient α=−ln(rac)/(4Rf), plotted in Figure 5a. As a guide to the eye, a least-squares fit to α(f)=af2, with a as a constant, in the range f=20–60 GHz is also plotted for the case of Rf=1150 nm. (Cylinder vibrational modes dominate below this range and measurement noise dominates above.) The near-quadratic frequency dependence and the value of α are in reasonable agreement with previous measurements of the ultrasonic attenuation in silica32.

Figure 5
figure 5

Experimental results for the ultrasonic attenuation. (a) Ultrasonic attenuation coefficient α(f) obtained from acoustic echoes for Rf=600 and 1150 nm. The dashed line is a quadratic fit to the Rf=1150 nm data. (b) Ultrasonic attenuation at 44 GHz, αB=α(fB), vs distance L, obtained from Brillouin oscillations for the case of Rf=1150 nm. The effective value derived from b is indicated by the dot in a.

Photoelastic interaction in an equivalent lossless material

In order to better follow the amplitude of the coherent phonon pulses through Brillouin oscillations, we removed the thermal relaxation and vibrational contributions to δR(t) by subtraction of a polynomial fit to the background. We then obtained the envelope E(t) of the Brillouin oscillations from the absolute value of the analytic signal33. E(t) for the case of Rf=1150 nm, for which the best signal-to-noise ratio was obtained, is shown in Figure 6a. The strain pulse first reaches the back of the fibre at t2 ≈0.4 ns; it then returns to the front surface as the first echo at ≈0.8 ns. Consider two times tA<t2 and tB=2t2tA symmetrical with respect to their average, t2, as shown in Figure 6a. The strain pulse is detected at the same distance L=(t2tA)vl from the back of the fibre at tA and tB. The quantity ln[E(tA)/E(tB)]/(2L) therefore yields the average ultrasonic attenuation at the Brillouin frequency, αB=α(fB), over a region of length 2L. We plot αB vs L in Figure 5b for the case of Rf=1150 nm using the same vertical scale as in Figure 5a. The attenuation αB~0.18 μm−1 is largely constant (the dip at 600 nm arises from noise on E(tB)), showing good agreement with Figure 5a (as marked by a dot).

Figure 6
figure 6

Results for the Brillouin-oscillation envelope and fits. Analysis of the data for the case of radius Rf=1150 nm. (a) Normalized Brillouin-oscillation envelope E(t). (b) Equivalent plot of E′(x) for the lossless case as a function of the distance x for propagation from the front surface of the fibre to the back and vice versa.

The envelope E(t) is affected by both the spatial variation in the strain-pulse amplitude and in the intensity of the optical probe. We define E′(x)=E(x)/exp(−αBx) to compensate for ultrasonic attenuation at fB, where in this formula x is the radial coordinate folded around the symmetry point, which is at the back of the fibre at a distance vlt2=2Rf from the front surface (the latter position being at x=0). Figure 6b shows a plot of E′ vs the distance x. E′ represents the amplitude of the photoelastic interaction in an equivalent lossless material as the strain pulse propagates from the front to the back of the fibre (lower blue curve) and from the back to the front (upper red curve). The curves approximately superimpose, as expected, as losses have been eliminated. For x1700 nm, optical reflections from the back of the fibre modify the observed spatial variation of E′. We therefore restrict our attention to the region x1700 nm. Over this region, E′ shows a monotonic decrease. In the next section, we provide an analytical background to these observations.

Discussion

Consider the representative case of Rf=1150 nm. We assume that the optical beam divergence is small enough for the paraxial (that is, Gaussian) approach to beam propagation to be approximately valid34. Consider first the evolution of the optical probe beam of wavelength λ=400 nm. This beam is focused to a spot of radius Wpb≈0.4 μm at 1/e2 intensity at the fibre surface (that is, at x=0, where the positive x direction points towards the centre of the fibre; Figure 1). We define wE(x) as the optical probe-beam radius in air at 1/e2 intensity:

where is the optical Rayleigh length in air. describes the position of the beam waist; for the incident beam, . This beam is refracted at the fibre surface, and within the present approximation remains Gaussian inside the fibre with radii wEy′ and wEz′ described by equations similar to Equation (1), where y is the coordinate perpendicular to x and to the fibre axis, and z is the coordinate along the fibre axis. The laws of refraction at front side of the fibre, that is, at x=0, impose that the radii of curvature of the incident wavefront, RE, and that of the wavefront refracted in the y and z directions, REy′ and REz′, are such that n/REy′(0)=1/RE(0)+(n−1)/Rf, n/REz′(0)=1/RE(0), and that the radii of the beams are equal at this point, wE(0)=wEy′(0)=wEz′(0)35. The normalized (x, y, z) profile of the probe-beam intensity inside the fibre is given by:

We plot the calculated Gaussian optical probe-beam radius inside the fibre, wEy′, vs x in Figure 1b in blue. In the z direction, the beam diverges slowly in a linear fashion. In the y direction, the beam is weakly focused at position x≈750 nm inside the fibre to a spot of 1/e2 intensity radius ~360 nm.

Now consider the evolution of the acoustic beam for the case of Rf=1150 nm. This beam should, for our acoustic wavelength λARf, also approximately follow paraxial (Gaussian-beam) theory34, 36. Its radius wA(x) at 1/e2 strain amplitude can be described by an equation similar to Equation (1), with a waist of Wac (1/e2 radius). The radius of curvature of the acoustic beam, Rac, is equal to the radius of the fibre at the surface, Rac(0)=Rf, and wA is equal to the radius of the pump beam at the front side of the fibre, wA(0)=Wpp. Since WppλA, the location of the acoustic waist is very close to the centre of the fibre. (Here, for simplicity, we assume that acoustic diffraction, as well as acoustic propagation along the axis of the fibre, are negligible on the short timescales of our experiments, and that the acoustic beam radius wAz along the z direction is a constant determined by the optical pump-beam radius Wpp≈0.8 μm.) Under these approximations,

where Wac=2RfλA/(πWpp)≈125 nm, and is the acoustic Rayleigh length. under these approximations describes the position of the acoustic beam waist at the centre of the fibre. The strain pulse spans a distance ~2d=60 nmRf along the x axis (see inset of Figure 2a), thus, for the purposes of analysing Brillouin oscillations, one can approximate the temporal variation of the normalized (x, y) profile of the longitudinal acoustic strain for t<2Rf/vl by the equation:

We plot the Gaussian acoustic-strain beam radius wA vs x calculated in this way in Figure 1b for wavelength component λA=136 nm for the case of Rf=1150 nm. The acoustic beam converges, focuses at the centre of the fibre to a spot of 1/e2 radius for strain equal to Wac≈125 nm, which is similar in order to λA, and then diverges.

This analytical approach can be validated by 3D finite-element simulations (see Supplementary Information for details). Figure 7a shows optical probe-beam simulations for an Rf=1150 nm uncoated (for simplicity) silica fibre, using the probe-beam parameters quoted above. (In practice, the fibre curvature and plasmonic excitation in the metal film will cause the pump-beam optical absorption over the fibre surface to depart to some extent from an exact Gaussian distribution, but we ignore these effects in this approximate analysis.) The expected divergence of the optical electric field (Ez) distribution is clearly visible, and the simulated 1/e2 beam radius for optical intensity (solid lines in Figure 7a) agrees reasonably well with Gaussian theory (dashed lines that ignore optical back reflections). The small wiggles in the simulated beam radius arise from sampling curved wavefronts along planes perpendicular to the x direction (See Supplementary Information for further details).

Figure 7
figure 7

Optical and acoustic simulation results. (a, b) Simulated optical-probe electric field amplitude Ez and volumetric strain ηxx+ηyy at 44 GHz, respectively, in an uncoated fibre of radius Rf=1150 nm. Respective 1/e2 intensity and volumetric-strain-squared ((ηxx+ηyy)2) beam radii (wE(x) and , respectively) from the 3D numerical simulations (solid lines) and from Gaussian-beam theory (dashed lines) are superimposed. The arrows in b refer to the forces used for excitation. (cf) Equivalent simulations for fibres of radius Rf=600 and 435 nm, respectively.

Figure 7b shows a single-frequency acoustic simulation of the longitudinal strain for the case of Rf=1150 nm. (We have chosen to plot strain-squared Gaussian profiles in Figure 7 by analogy with the optical-intensity Gaussian profiles in the same figure.) A sinusoidal force at 44 GHz with a Gaussian spatial distribution on the fibre surface (over a 1/e2 radius of 800 nm for strain) provides a reasonable approximation for the acoustic generation by the pump beam associated with the Brillouin oscillations. The 1/e2 acoustic-strain-squared ((ηxx+ηyy)2) beam radius derived from the simulation (solid lines in Figure 7b) also agrees reasonably well with Gaussian theory (dashed lines that ignore acoustic back reflections). The small discrepancies arise because of the approximations inherent in the paraxial Gaussian-beam theory, the approximate strain distribution used on the fibre surface and the sampling of the strain field along curved wavefronts. (See Supplementary Information for further details.)

The simulated optical-probe (Figure 7c and 7e) and acoustic-strain (Figure 7d and 7f) fields for the two smaller-radii data sets are also shown in Figure 7, exhibiting similar behaviour to the case of Rf=1150 nm in each case. In particular, the acoustic spot sizes are comparable for all the fibre radii investigated. We did not include the Gaussian-beam theory for the smaller fibre radii because as the fibre radius becomes comparable to the wavelength or source sizes, this theory becomes less accurate.

The initial decrease and subsequent increase of the optical probe-beam radius wE′(x) with x inside the fibre for the case of Rf=1150 nm and the acoustic focusing within the fibre govern the monotonic decrease of the lossless envelope E′(x), although a quantitative explanation is beyond the scope of this paper. The above analytical analysis, supported by the 3D simulations, suggests that for this fibre radius the acoustic beam is focused to a 1/e2 radius beam waist of Wac≈125 nm for the strain, that is, to a 150-nm FWHM waist. This is similar to the acoustic spot sizes previously demonstrated in higher-frequency picosecond-ultrasonics-based experiments on layered semiconductor heterostructures (that is, a planar geometry not suitable for optical access from any direction)9. In contrast, in the present experiments, the acoustic waves are focused inside a 3D micron- to sub-micron-sized structure close to a waist ~150 nm in diameter, as is evident in the acoustic simulations for all the fibre radii investigated.

Conclusions

Picosecond ultrasonics is an all-optical technique for the generation and the detection of acoustic pulses of nanoscale wavelength by femtosecond laser pulses, with broad application to the nondestructive evaluation of nanostructured materials and fundamental research. However, this technique has been hampered for general application by the ~1-μm diffraction limit of focused light pulses, thus restricting the lateral resolution. Indeed, research on depth profiling using Brillouin scattering has not been able to overcome the optical diffraction limit for the lateral resolution29, 37, 38, 39. The present research is an important step in removing this constraint. The choice of a sample with a curved surface in the form of a transparent silica fibre of radius as small as ~400 nm allowed us to track the focusing of GHz coherent phonon wave packets in a 3D structure with outer dimensions down to sub-micron in size. As well as following these wave packets with Brillouin oscillations, we also accessed the vibrational resonances. An analytical model, supported by 3D simulations, suggests that the 44-GHz Brillouin component of the acoustic beam is focused to a spot ~150 nm in diameter.

This technique holds great promise for future developments. The use of shorter-wavelength optical probe light or a higher refractive-index medium would allow higher acoustic frequencies to be accessed, and to the production and monitoring of yet smaller acoustic spot sizes. This ability to monitor tight acoustic focusing within sub-micron transparent objects should allow the design of acoustic transducers for nanoscale imaging applications in cellular biology or nanotechnology. In particular, from a series of optical pump and probe measurements at different angles40 around sub-micron cylindrical fibres or spheres with cavities containing nanoscale samples, this study should open the way to nanoscale cross-sectional imaging using picosecond-ultrasonic computed tomography, allowing for the first time the 3D acoustic imaging of media with nanoscale resolution in both the lateral and in-depth directions. Moreover, by the use of metal-coated cylindrical or spherical sub-micron hollowed regions on the end of an immersed tapered fibre in a standard near-field scanning optical microscope geometry, pump and probe light internal to the fibre can be used to follow focused GHz acoustic phonon pulses in liquids through Brillouin scattering, thus significantly extending the resolution of 3D acoustic imaging41 of biological structures to the nanoscale.

Author contributions

TD and OBW wrote the text. TD, KI and MT carried out the experiments. VEG, OM, OBW and TD performed the theoretical analysis. IAV, PHO and MT carried out the simulations. ST and MF prepared the sample. OBW and MT formulated the research plan. All authors reviewed the manuscript.