Ultrafast Nonlinear Optical Effects of Metal Nanoparticles Composites

2.1. Time-domain discrete-dipole approximation for the calculation of the ultrafast nonlinear optical responses of composites containing metal nanoparticles with different sizes and shapes

To evaluate the change of the dielectric function of metals, we should obtain the distribution of the amplitude of the enhanced field A_enh(t) in metal NPs. The popular numerical method for calculating the transient field distribution in NPs is the finite-difference time-domain (FDTD) method. However, for the evaluation of the ultrafast nonlinear change of the dielectric function of a metal, we should know the amplitude A_enh(t) which requires very significant computational effort with FDTD. For the evaluation of A_enh(t), we use the time-domain discrete-dipole approximation (TDDDA) [10, 11]. Below, we briefly describe the basics of this numerical approach.

TDDDA is a numerical tool for evaluating the distribution of amplitude of real or enhanced field in metal NPs with arbitrary sizes and shapes. It is a time-domain version of conventional frequency-domain discrete-dipole approximation (DDA). TDDDA describes NPs as the collection of small dipoles. The amplitude A_m of the enhanced field at the m-th dipole is given by the following integral-differential equation:

where ε_h is the permittivity of the host medium, c₀ is the light velocity in vacuum, Amin and Q_m are the amplitudes of the incident field and polarization at the place of the m-th dipole, r_m⊥ = (k∙r_m)/k is the projection of r_m onto the direction of wavevector k of incident pulse, with r_m being the position vector at m-th dipole. In Eq. (1), Gmn(0), Gmn(1), and Gmn(2) are tensors given by

where k₀ = ω₀/c₀ is the wave number at the central angular frequency ω₀ of incident light pulse, R_mn = |r_m−r_n|, r^mn=(rm−rn)/Rmn. The amplitude of the polarization Q_m(t) in Eq. (1) is determined by Qm=βAm+Qm1, where β = [ (ε_∞/ε_h) − 1]/(4π), ε_∞ is the dielectric function for infinite frequency. In this formalism, we use the extended Drude model for the linear dielectric function of a metal given by εm0=ε∞−ωp2/(ω2+iγω), where ω_p is the plasma frequency, and γ is the electron collision frequency. In the equation for Q_m, Q_m1 is determined by

where a=ωp2/(4πεh),b=−(ω02+iγω0), and c = γ − 2iω₀. The basic principle of TDDDA and the detailed derivations of the above equations can be found in Ref. [10].

2.2. Transient nonlinear Kerr-type optical nonlinearity

The transient nonlinear optical response of metal NPs is related with the electron and phonon temperatures. Upon illuminating metal nanoparticles, femtosecond laser pulses excite the nonequilibrium electron distribution and thermalization process follows through the interactions between electrons. The time scale of electron-electron interactions τ_ee is about a few hundreds femtoseconds. The electron system transfers its energy to the lattices through electron-phonon coupling, the time scale τ_ep of which is a few picoseconds. The thermalized part of electrons, in part, is cooled through heat exchange with lattices in the NPs. The above outlined processes can be described by the following phenomenological rate equations (see e.g., Refs. [14, 15]):

where N is the energy density stored in the nonthermalized part of the distribution; P(t) is the absorbed laser power per unit volume; δ is a constant representing the contribution of light field to the generation of excited nonequilibrium electrons; C_e and C_L are the heat capacities, C_e and C_L are the temperatures of electrons and lattices, respectively; G is the cooling time constant.

The above rate equations describe only the temperatures of thermalized electrons and lattices. The relations between the optical responses of metal nanoparticles and these temperatures can be found by the following considerations. The change of transient transmittance ΔT, an experimentally observable nonlinear quantity, is a linear function of the dielectric function of NPs [14]:

where T is the transmittance of the composite, ε₁ and ε₂ are real and imaginary parts of the dielectric functions of metal, and Δ represents the change of the corresponding quantities. The change of dielectric functions depends on redistribution of the electron energy in the vicinity of the Fermi level. Such a change can be accurately described by a linear function of the electronic and lattice temperatures [14] in the case of weak pump energy and the above equation can be represented as

where a and b are constants.

From Eqs. (5) and (6), we can conclude that, in the considered case, the change of dielectric function of metal is proportional to the change of electronic and lattice temperatures. The empirical results show, however, that the influence of lattice temperature on the dielectric function change is negligible. From these facts, the change of the dielectric function of a metal Δε_m can be written [16]:

where η is a constant.

The disadvantage of this model is that it cannot directly account for the nonlinear optical parameters such as nonlinear refractive index and absorption. To solve this problem, below we relate the unknown parameters in Eqs. (4) and (7) with the nonlinear optical susceptibility of the metal which can be experimentally determined.

From the second and the third equations in Eq. (4), we obtain

Introducing the cooling time τ_ep = C_eC_L/[G(C_e + C_L)] and taking into account that the increase of lattice temperature can be neglected compared to that of electrons and T_e − T_L ≈ T_e − T₀, we obtain

where T₀ is the initial temperatures of electrons and lattices. On the other hand, integrating the first equation in Eq. (7) we have

where τee′−1=τee−1+τep−1. Combining Eqs. (9) and (10), we obtain

From Eq. (7),

By using Eqs. (11) and (12), we can write

where ε_m is the dielectric function of metal as a function of time and incident intensity, and δ′ = ηδ. The absorbed energy density P(t) must be proportional to the enhanced intensity in the metal NPs and therefore we find

where β is a constant proportional to δ′[Ce−1−CL−1(τee/τep)] and A_enh(t) is the amplitude of enhanced field. To determine the constant β, we consider the steady-state nonlinear solution of Eq. (14). For a steady-state pumping, Eq. (14) gives Δεm,static=βτep|Aenh|2 and we have β=χm(3)/τep, where χm(3) is the inherent degenerate third-order susceptibility of the metal. Consequently, we obtain [17]

Since the pure e-e scattering time τ_ee (typically around 100 fs) is much shorter than τ_ep (typically around or longer than 1 ps), in Eq. (15), τee'can be replaced with τ_ee. The resultant dielectric function is determined by ε_m= ε_m0 + Δ ε_m(t), where ε_m0 is the linear dielectric function of metal.

Equation (15) is the major governing equation for the ultrafast nonlinear optical responses of metal nanoparticles.

3.1. The effective medium approximation

The transient distribution of the amplitude A_m obtained by using Eq. (1) is used for the calculations of the distribution of the nonlinear dielectric function εnNL in metal nanoparticles, on each time step by using Eq. (15). The effective nonlinear dielectric function of the metal nanocomposite is calculated by using the effective medium approximation (EMA) εeffNL=⟨εA⟩/⟨A⟩ [9], where the average is done over the distribution of dipoles and A is, the amplitude of the enhanced field. In the calculations based on EMA, the dielectric function ε and the field amplitude A in the nanoparticle region are εm,nNL (subscription m represents metal and n denotes the value at n-th dipole) and the enhanced field A_m calculated with the TDDDA. In the spatial areas outside of the nanoparticles, we take the permittivity of the host ε_h as ε and the amplitude of incident field as A. The volume of host medium is calculated using the filling factor f, which is the volume ratio of metal NPs to the volume of the host medium. After obtaining the effective nonlinear dielectric function of metal nanocomposite εeffNL, one can calculate the nonlinear optical characteristics such as the nonlinear effective index and absorption coefficient. The effective refractive index of the composites is determined by neffNL=ReεeffNL. The nonlinear effective absorption coefficient of the composite is given by αeffNL=2(c0/ω0)ImεeffNL and the transmittance by TNL=exp(−αeffNLl), where l is the thickness of the composite film. Then, the relative change of transmittance ΔT/T is calculated by (T^NL−T^L)/T^L, where T^L is the linear transmittance.

For the special case of very small and spherical NPs, the amplitude of the enhanced field can be approximately calculated by A_enh(t) = x(t)A₀(t), where x(t) = ε_h/[ε_m(t) + 2ε_h] is the transient field enhancement factor and A₀ is the amplitude of the incident pump pulse. The nonlinearly modified ε_m(t) is self-consistently calculated in combination with the above-mentioned enhanced amplitude A_enh(t). The resultant effective dielectric function of the composite εeffNL is calculated by using Maxwell-Garnett model.

3.2. Numerical results and discussions

In this section, we present the numerical results for the ultrafast nonlinear optical responses of metal NPs composites.

Figure 1 shows an example of the time-dependent nonlinear transmission of a metal nanocomposite. The figure shows ΔT/T of a 0.2-μm-thick Al₂O₃ film doped with Ag NPs. We consider NPs with diameter of 6.5 nm, and a filling factor of 1%. The value of pump fluence is assumed to be 100 μJ/cm². For the optimal fit with the experimental data [18], we use the e-e and cooling times of τ_ee = 100 fs and τ_ep = 0.70 ps, correspondingly. Though the pump pulse is in the sub-100 fs range, the transmittance responds slower, which is explained by the delayed thermalization of electrons. In both cases, the time necessary to reach a maximum change in the transmittance is roughly 200–250 fs longer than the e-e scattering time τ_ee. The exponential decay of the transmittance change depends on the cooling time τ_ep and also on the pump fluence. Here we assume for the two response times τ_ee = 100 fs and τ_ep = 1 ps.

Figure 2 presents the transient behavior of the effective refractive index (a) and the transmittance (b) of a 1-μm-thick silica glass layer doped with very small Ag nanospheres at pump light at 430 nm. In Figure 2, one can see that the relaxation of the transmittance is slower for a higher fluence of the incident light even for a fixed value of inherent cooling time of silver as large as 1 ps.

To investigate the dependence on the NP shape, we numerically investigate the ultrafast nonlinear responses of composites containing nonspherical metal nanoparticles, considering silica glass doped with silver nanorods. To study the dependency of the ultrafast nonlinear responses on the aspect ratio, we have taken nanorods with constant volumes. Note that the quantities presented in Figures 3(a) and (b) have been averaged over the possible polarization directions versus the orientations of nanorods. For the simulations, we have taken nanorods with different aspect ratio and geometry, as indicated in the figure. Figure 3(a) illustrates extinction spectra of silver nanorods with different aspect ratios, embedded in silica. As the figure shows, nanorod with a larger value of the aspect ratio (length divided by the diameter) exhibits surface plasmon resonance (SPR) at a longer wavelength. The main SPR peaks appear at 595, 680, and 800 nm for silver nanorods with aspect ratio of 1.68, 2.25, and 3.11, respectively. These peaks represent dipole plasmonic resonances for the case when the axes of nanorods are parallel to the polarization of incident light. The minor SPR peaks, which correspond to the dipole resonances for the polarization direction of incident wave perpendicular to the axes of nanorods, also appear (at around 470 nm). Figure 3(b) illustrates the nonlinear change of relative transmittance ΔT/T for the different aspect ratios of silver nanorods at the wavelengths corresponding to the main SPR peaks. The figure also shows that the maximum change of ΔT/T becomes larger for the nanorod with larger aspect ratio. We can expect that the stronger nonlinear response originates from a stronger intensity enhancement in the silver nanorod, which we can confirm from Figure 3(c).

With the theoretical tool for calculation of the ultrafast nonlinear optical responses of metal NPs composites, below we theoretically demonstrate its possible use for the mode-locking and slow light devices by using these materials.

4.1. Mode-locking of solid-state lasers

In this subsection, we present the general passive mode-locked operation of solid-state lasers taking Ho:YLF laser pumped with a diode laser as an example and a metal nanocomposite as saturable absorber.

The master equation for mode-locking of solid-state lasers can be written as follows [19]:

where D is the second-order intracavity group delay dispersion (GDD), Dg,f=g/Ωg2+1/Ωf2 the gain and intracavity filter dispersion, Ωg and Ωf are the gain and filter bandwidth, respectively. The coefficient δ=(2π/λ0AL)n2lL represents the nonlinear effect by the Kerr nonlinearity in the gain crystal leading to self-phase modulation (SPM), where λ₀ is the central lasing wavelength, n₂ is the nonlinear index of laser active medium, A_L and l_L are the effective mode area and optical pass per round-trip. The gain coefficient is given by g=g0/[1+E/(PLTR)], where g0 is the small-signal gain, E is the pulse energy, P_L is the saturation power of laser material, l is the linear loss inherent to the passive resonator, and q is the loss by saturable absorber.

As an example, we investigate the mode-locking of a Ho:YLF laser operating at 545 nm and pumped at 445 nm which contains SCHOTT glass N-BAK 4 doped with Au NPs (with filling factor 2×10−3). In such a case, the laser gain medium functions as a three-level system [20]. The Ho:YLF crystal has an emission linewidth of roughly 18 nm and a strong absorption peak around 450 nm which can be used for pumping with high power laser diodes. We have assumed the absorption cross sections at 445 and 545 nm to be 3×10−21 cm² and 5×10−21 cm², correspondingly, emission cross section at 545 nm to be 8×10−21 cm² [21], and the fluorescence lifetime of 110 μs [21]. The lasing transition corresponds to 5S2−5I8 [20]. For the Ho³⁺ concentration of 1.2×1020 cm⁻³, a beam area on the crystal with 1000 μm², a pump intensity 0.6 MW/cm² corresponding to a pump power of 6 W, a crystal length of 10 mm, and a resonator length of 1 m corresponding to a repetition rate of 0.15 GHz, we have the main laser parameters of g₀ = 0.22, P_L = 4.69 W, Ω_g = 57.08 THz, and δ = 3.94 MW⁻¹. We assumed the passive resonator loss to be l = 0.02. As the saturable absorber for passive mode-locking, we consider a metal nanocomposite given by a layer of SCHOTT glass (N-BAK 4) doped with small Au NPs. The plasmon resonance is found at 543 nm and we expect strong saturable absorption since the plasmon resonance peak is located near the central lasing wavelength. The saturable absorber loss is determined by q(t)=−i(ω/c)εeff(t)d, where ω is central frequency, and d is the thickness of metal nanocomposite absorber. The cross section of beam on the metal nanocomposite absorber is taken to be 0.01 mm².

Figure 4 presents results for the passive mode-locking behavior of a Ho:YLF laser obtained by the solution of Eq. (16). Here, the GDD parameter has a value of −20 fs². As Figure 4(a) shows, the pulse duration rapidly decreases during the early stage of mode-locking and it is then stabilized.

The numerical results show that the shortest pulse duration of about 100 fs is much smaller than the recovery time of 1 ps. In the early time of femtosecond pulse generation in solid-state lasers by the use of saturable absorbers for passive mode-locking, it was believed that the shortest pulse duration cannot be smaller than the recovery time of the absorber. However, due to the combined influence of spectral broadening by SPM and GVD, a slow response of the absorber with a recovery time larger than the pulse duration is sufficient for mode-locking [22, 23]. Pulse stabilization and shaping mechanism in this case can be explained by the fact that the action of the absorber steadily delays the pulse, similar as in solid-state lasers mode-locked by a semiconductor saturable absorber [24, 25]. Thus, the pulse moves slower than any noise structure behind the pulse maximum, and therefore, it fuses with the main pulse before it experiences high enough gain. This behavior is illustrated in Figure 4(b).

Figure 5 shows results for the dependences of pulse duration and energy on the parameters of the laser.

The resonator dispersion (the GDD parameter) is one of the key parameters affecting the mode-locking stability, pulse duration as well as energy. The simulations predict that the pulse evolution is unstable for the GDD parameter D from −55 fs² up to around −3200 fs² for the other parameters equal to those in the above subsections. The physical mechanism of the instability is the imbalance between the pulse delay, originating from the delayed absorber response in the metal nanocomposite, and pulse reshaping by the dispersion. In Figure 5, we show the dependence of the pulse duration and energy on the intracavity dispersion for a filling factor of 2 × 10⁻³. As the dispersion increases, the pulse duration increases as well, independent of the sign of dispersion.

Figure 5(c) depicts the dependences of pulse duration and energy on the filling factor for D = −20 fs² and the beam area on the metal nanocomposite. For a small filling factor, we find a small maximum loss change leading to a larger pulse duration. For a filling factor smaller than 1.7 × 10⁻³, mode-locking becomes unstable. For a filling factor larger than 2.1 × 10⁻³, the total linear loss introduced by the saturable absorber is higher than the gain and the lasing itself becomes impossible.

In Figure 5(d), pulse duration and energy are presented in dependence on the beam area for the metal nanocomposite absorber film with D = −20 fs² and f = 2 × 10⁻³. In the figure, the mode-locking process is stable for the beam area larger than 0.1 mm² or smaller than 6000 μm². The pulse duration increases as the beam area increases, caused by the change of the reduced maximum. The possible duration range is from 110 fs to 1.31 ps. The shortest pulse duration of 100.7 fs is predicted for D = 0, beam area 6000 μm², and filling factor 2 × 10⁻³.

Mode-locking of solid-state lasers by a slow absorber but shaped by the interplay between negative group-delay dispersion and SPM is often interpreted by the mechanism of soliton mode-locking, where the pulse is completely shaped by soliton formation and the saturable absorber only stabilizes the soliton against the growth of noise [23]. Whether such regime is indeed realized can be estimated by the ratio R=−8ln(2+1)D/(δEτ0), where τ₀ is the pulse duration full width at half maximum (FWHM). If the value of R is equal to 1, the pulse formation mechanism can be interpreted by soliton mode-locking. In Figure 5(b), the ratio R is depicted by the green triangles. As can be seen in the left stability range, the factor R is in the range of 0.5, while in the right stability range, R is near zero. This means the predicted mode-locking behavior cannot be interpreted by the mechanism of soliton mode-locking, and in contrast to this interpretation, the action of the saturable absorber influences the pulse parameter. This is also confirmed by the calculated frequency chirp in Figure 5(d) which is not zero unlike that of a soliton. Note that the very specific regime of soliton mode-locking is not requested and femtosecond pulse generation in solid-state lasers by slow absorbers can be achieved under more general conditions [22].

4.2. Mode-locking of semiconductor lasers

Here, we investigate the possibility of femtosecond pulse generation by mode-locking of semiconductor disk lasers (SDLs) in visible range by using of metal nanocomposites as slow saturable absorbers. In contrast to the solid-state gain media, the semiconductors exhibit a dynamic gain in one round trip of the pulse in the resonator. This characteristic makes the process quite different from the mode-locked solid-state lasers but similar to one in passively mode-locked dye lasers. Mode-locking in this case rely on the interplay between a slow saturable absorber and slow gain saturation, which opens a net gain window in time, so that the pulse itself experiences gain per round trip and noise is discriminated outside this net gain window.

Passively mode-locked operation of the SDLs is described by the following master equation:

where α is the linewidth enhancement factor [26, 27]. In the above equation, the gain coefficient g(t) is given by [26]

where τ_g is the gain recovery time and E_g is the gain saturation energy dependent on the saturation fluence and the beam diameter on the gain medium. The temporal dynamics of the gain leads to a depletion of the leading edge of pulse which is absent in the case of solid-state lasers due to the quasi-static gain. On the other hand, the slow saturable nanocomposite absorber suppresses the trailing edge, and the combined action of both creates a net gain window with negative gain both on the leading and the trailing front of the generated pulse.

As an example, we consider a GaN-based SDL [27] operating with a central lasing wavelength of 420 nm. The small signal gain is chosen to be g₀ = 2, the gain linewidth Ω_g = 2π × 20.39 THz, the linewidth enhancement factor α = 2.8 Lu et al. [27], the gain recovery time to be 1 ns [28], and the saturation energy for the gain medium to be 0.6 nJ. As a saturable absorber, we consider a silica glass film doped with Ag nanospheres with diameters smaller than 10 nm. The filling factor is taken to be 7 × 10⁻³. In this case, the plasmon resonance is located at 414 nm and the composite exhibits strong saturated absorption near 420 nm.

In Figure 6, we present an example of passively mode-locked operation of this laser with a cavity dispersion of D = 100 fs² and a beam area on the metal nanocomposite of 0.002 mm². As can be seen in Figures 6(a) and (c) in this case, pulse shortening happens in the very beginning of the process up to about 20 ns, while the stabilization is achieved after about ~200 ns and is faster than in solid-state lasers (several μs). Figure 6(c) depicts the temporal behavior of gaun, saturable loss, and pulse power. Figure 6(d) shows both the intensity and frequency profile. The resultant pulse duration is about 83 fs and the pulse is positively chirped. This can be explained by the nonlinear index of the gain and absorber medium. The nonlinear refraction in the gain medium originates from the linewidth enhancement, due to the enhancement of the spontaneous emission into a lasing mode by the high cavity quality factor of the microcavity in the vertical cavity structure of the semiconductor disk gain medium.

Figures 7(a) and (b) show the dependences of pulse duration and energy on the cavity dispersion D. One can see that pulse shaping is unstable for the range of small dispersion (from D = −150 to 40 fs²). The figure shows that the achievable shortest pulse duration is about 54.0 fs for negative dispersion of D = −160 fs² and about 55.3 fs for positive dispersion of D = 50 fs². For filling factor smaller than 6 × 10⁻³ due to the insufficient dynamic range of saturable loss, the mode-locked operation becomes unstable. For filling factor larger than 7 × 10⁻³, the lasing itself is impossible due to the negative small signal net gain. For f = 6 × 10⁻³, τ₀ = 87.14 fs and E = 0.69 nJ, and for f = 7 × 10⁻³, τ₀ = 83.23 fs and E = 0.55 nJ. These values are calculated for D = −300 fs².

In Figures 7(c) and (d), we show the dependencies of pulse duration and energy on the beam area on the metal nanocomposite absorbers for both cases of positive and negative cavity dispersions, −300 and 300 fs².

In comparison with other well-established mode-locking elements such as semiconductor saturable absorber mirrors (SESAM), quantum dots, and carbon nanotubes, the operation range of metal nanocomposites as saturable absorber can be extended to much shorter wavelengths, down to the blue spectral range. Saturable absorbers in the visible spectral range can be realized by dyes dissolved in different solvents, but disadvantages such as maintaining a constant stream in the dye jet, temperature sensitivity, and long-term instability restrict their versatility. Different metal nanoparticle composites offer several advantages and allow the development of very compact and cheap mode-locking devices with tunable operation regions, extending from IR down to the blue spectral region. After the prediction of the possible application of metal nanocomposites for mode-locking of solid-state lasers [13] and semiconductor lasers [17], several groups successfully exploited nanoparticles for the generation of ultrashort pulses in mode-locked fiber lasers (see e.g. Refs. [29, 30], or solid-state lasers [31]).