2. SELF-FOCUSING OF AMPLITUDE-MODULATED GAUSSIAN LASER BEAM

We consider an amplitude-modulated Gaussian laser (Gaussian in space) beam of frequency ω₀, propagating in the z-direction and polarized along the x-direction in a collisionless, unmagnetized, hot, and homogeneous plasma. The laser field, at z = 0 is given by

(1)$${\bf E}_0 = \hat{x} E_{00} (1 + {\rm \mu} \cos {\rm \Omega} t)\,{\rm exp}( - x^2 /2r_0^2 )\,{\rm exp}(i{\rm \omega} _0 t), $$

where Ω is the frequency of modulation and μ is the index of modulation. r ₀ is the initial pulse width of the laser. Because of the nonuniform spatial intensity distribution of the laser pulse, a ponderomotive force is exerted on the electrons in the plane transverse to the direction of propagation (z-direction). The ponderomotive force in the presence of laser pulse is given by Sodha et al. (Reference Sodha, Ghatak and Tripathi1976).

(2)$${\bf F}_{\rm P} = - \displaystyle{{e^2} \over {4m{\rm \omega} _0^2}} \left( {{\bf \nabla} ({\bf E}_0 \cdot {\bf E}_0 ^* )} \right). $$

This ponderomotive force leads to the redistribution of electrons. Assuming ${\rm \Omega} \ll {\rm \omega} _0 $, the modified electron density can be written as (Sodha et al., Reference Sodha, Salimullah and Sharma1980),

(3)$$N = N_0 \,{\rm exp}\left[ { - \displaystyle{{e^2} \over {8mk_{\rm B} T_0 {\rm \omega} _0^2}} \left( {{\bf E}_0 \cdot {\bf E}_0 ^ *} \right)} \right], $$

where, T ₀ is the temperature of the plasma and k _B is the Boltzmann constant.

The propagation of laser pulse in the plasma is governed by the wave equation:

(4)$$\displaystyle{{{\partial} ^2 {\bf E}_0} \over {{\partial} x^2}} + \displaystyle{{{\partial} ^2 {\bf E}_0} \over {{\partial} y^2}} + \displaystyle{{{\partial} ^2 {\bf E}_0} \over {{\partial} z^2}} = \displaystyle{1 \over {c^2}} \displaystyle{{{\partial} ^2 {\bf E}_0} \over {{\partial} t^2}} + \displaystyle{{4\pi} \over {c^2}} \displaystyle{{{\partial} {\bf J}} \over {{\partial} t}}, $$

where J is the total current density in the plasma in the presence of laser pulse. Assuming E₀ to be varying in space and time as:

(5)$${\bf E}_0 = \hat{x} A_0 (x,z,t)\,{\rm exp}[i({\rm \omega} _0 t - kz)], $$

and

(6)$$A_0 = \displaystyle{{E_{00} \left[ {1 + {\rm \mu} \cos {\rm \Omega} t} \right]} \over {\,f^{1/2} (x,z,t)}}{\rm exp}\left[ {\displaystyle{{ - x^2} \over {2r_0^2 f^2 (x,z,t)}} - ikS(x,z,t)} \right], $$

where f and S are dimensionless beam width parameter and eikonal of the laser beam, respectively. The eikonal shows the slightly converging/diverging behavior of the laser beam in the plasma (Sodha et al., Reference Sodha, Ghatak and Tripathi1974). The eikonal (S) is given by S = 1/2x ²β(z, t)+Φ(z, t), where [β(z, t)]⁻¹ and Φ(z, t) represent the radius of the curvature of the wavefront and initial phase, respectively. The current density in the plasma can be written as (Sodha et al., Reference Sodha, Salimullah and Sharma1980)

(7)$${\bf J} \cong \hat{x} \displaystyle{{Ne^2} \over {mi{\rm \omega} _0}} \left( {A_0 + \displaystyle{i \over {{\rm \omega} _0}} \displaystyle{{{\partial} A_0} \over {{\partial} t}}} \right) \times {\rm exp}[i({\rm \omega} _0 t - kz)]. $$

Substituting the expressions for E₀ and J from Eqs. (5) and (7), respectively, in Eq. (4) and using the method adopted by Sodha et al. (Reference Sodha, Salimullah and Sharma1980), we obtain the equation governing the dimensionless beam width parameter (f) as

(8)$$\eqalign{\displaystyle{{d^2 f} \over {d {\rm \eta} ^2}} &= \displaystyle{1 \over {\,f^3}} - \left( {\displaystyle{{{\rm \omega} _{\rm p} r_0} \over c}} \right)^2 \displaystyle{{{\rm \alpha} E_{00}^2} \over {\,f^2}} \left( {1 + {\rm \mu} \cos {\rm \Omega} \xi} \right)^2 \cr & \quad \times\ {\rm exp}\left\{ { - \displaystyle{{{\rm \alpha} E_{00}^2} \over f}\left( {1 + {\rm \mu} \cos {\rm \Omega} \xi} \right)^2} \right\}},$$

where $z = {\rm \eta} kr_0^2 $, ξ = t−z/υ_g, ${\rm \upsilon} _{\rm g} = c \in _0^{{1 / 2}} $ and ${\rm \alpha} = (e^2 /(8\,mk_{\rm B} T_0 {\rm \omega} _0^2 ))$.

Equation (8) is solved numerically to study the self-focusing with initial condition, f = 1 at z = 0.

3. THz RADIATION GENERATION

We consider the propagation of amplitude-modulated Gaussian laser beam whose field is given by Eq. (1), through rippled density plasma. Plasma density is given by

(9)$$n = n_0 + n_q^{\prime}, $$

(10)$$n_q^{\prime} = n_q e^{ik_q z}, $$

where n _q and k _q are the amplitude and the wave number of the density ripple. This kind of density ripple can be created by different techniques (Hazra et al., Reference Hazra, Chini, Sanyal, Grenzer and Pietsch2004; Pai et al., Reference Pai, Huang, Kuo, Lin, Wang, Chen, Lee and Lin2005; Layer et al. Reference Layer, York, Antonson, Varma, Chen, Leng and Milchberg2007; Liu et al., Reference Liu and Tripathi2008). The laser propagates in the z-direction and polarized in the x-direction. Laser field is given by Eq. (5) and ponderomotive force is evaluated using Eq. (2) which comes out to be

(11)$${\bf F}_{\rm P} = - \displaystyle{{e^2} \over {4m{\rm \omega} _0^2}} {\bf {\rm \nabla}} \left( {\displaystyle{{E_{00}^2} \over f}(1 + {\rm \mu} \cos {\rm \Omega} {\rm \xi} )^2 {\rm exp}( - {{x^2} / {r_0^2 f^2 )}}} \right). $$

The analysis is consistent with that made in Section 1. This ponderomotive force imparts an oscillatory velocity (perpendicular to the direction of propagation) to the electrons at modulation frequency Ω. The nonlinear velocity of the electrons is given by

(12)$${\bf \upsilon} ^{{\rm NL}} = - \displaystyle{{{\bf F}_{\rm P}} \over {mi{\rm \Omega}}}. $$

When this nonlinear velocity couples with the density ripple, a nonlinear current is generated at a frequency Ω and wave number k _q in the direction perpendicular to the propagation of the laser beam. The nonlinear current is evaluated by

(13)$${\bf J}_\Omega^{\rm NL} = \displaystyle{{ - 1} \over 2}n_q^{\prime}\,{\ast} e{\bf \upsilon} ^{\rm NL}. $$

Using Eqs. (11)–(13), we get

(14)$$\eqalign{{\bf J}_{\rm \Omega}^{\rm NL} &= \displaystyle{{i{\rm \mu} n_q e^3 E_{00}^2 \,e^{( - x^2/r_0^2 f^2 )}} \over {4m^2 {\rm \omega} _0^2}} \left[ {\displaystyle{{2x} \over {r_0^2 f^3}} \displaystyle{1 \over \Omega} {\hat x }}\right. \cr & \quad \left. - \left\{ {\displaystyle{1 \over {{\rm \upsilon} _{\rm g} f}} + \displaystyle{1 \over {f^2 {\rm \Omega}}} \left( {\displaystyle{{2x^2} \over {r_0^2 f^2}} - 1} \right) \displaystyle{{\partial f} \over {\partial z}}} \right\}{\hat z} \right] e^{i\left\{ {{\rm \Omega} t - \left( {{{\rm \Omega} \over {{\rm \upsilon} _{\rm g}}} + k_q} \right)z} \right\}}}.$$

This nonlinear current gives rise to THz wave at frequency Ω and wave number Ω/υ _g+k _q, which is governed by the wave equation

(15)$${\rm \nabla} ^2 {\bf E}_T - {\bf \nabla} ({\bf \nabla} \cdot {\bf E}_T ) + \displaystyle{{{\rm \Omega} ^2} \over {c^2}} \in {\bf E}_T = \displaystyle{{4{\rm\pi} i\Omega} \over {c^2}} {\bf J}_\Omega ^{{\rm NL}}, $$

where

(16)$$ \in = 1 - \displaystyle{{{\rm \omega} _{\rm P}^2 } \over {{{\rm {\rm \Omega} }^2}}}. $$

As the nonlinear current given by Eq. (14), is responsible for the THz generation, the THz field will also vary as ~e^{i (Ωt −k_Tz}). Using Eqs. (14) and (15), the x-component of Eq. (15) is obtained as

(17)$$\eqalign{& 2ik_T \displaystyle{{{\partial} E_{Tx}} \over {{\partial} z}} + \left[ {\displaystyle{{{\rm \Omega} ^2} \over {c^2}} \left( {1 - \displaystyle{{{\rm \omega} _{\rm P}^2} \over {{\rm \Omega} ^2}}} \right) - k_T^2} \right]E_{Tx} \cr & \quad \cong \displaystyle{{ - 1} \over 2}\left( {\displaystyle{{n_q} \over {n_0}}} \right)\left( {\displaystyle{{{\rm \omega} _{\rm P}^2} \over {{\rm \omega} _0^2}}} \right)\displaystyle{{eE_{00}^2 {\rm \mu} x} \over {mc^2 r_0^2 f^3}} e^{ - \displaystyle{{x^2} \over {r_0^2 f^2}}} e^{ - i({{\rm \Omega} / {\upsilon _{\rm g} + k_q}} - k_T )z}}. $$

Using $k_T = ({\rm \Omega} /c)\left( {1 - \left( {{\rm \omega} _{\rm P}^2 /{\rm \Omega} ^2} \right)} \right)^{{1 / 2}} $, and applying exact phase-matching condition k _T = Ω/υ _g+k _q, Eq. (17) becomes

(18)$$\displaystyle{{\partial} \over {{\partial} z}}\left( {\displaystyle{{E_{Tx}} \over {E_{00}}}} \right) = \displaystyle{i \over 4}\left( {\displaystyle{{n_q} \over {n_0}}} \right)\left( {\displaystyle{{\omega _{\rm P}^2} \over {{\rm \omega} _0^2}}} \right)\left( {\displaystyle{{eE_{00}} \over {mc^2}}} \right)\left( {\displaystyle{{{\rm \mu} x} \over {r_0^2 k_T}}} \right)\displaystyle{{e^{\left( { - \displaystyle{{x^2} \over {r_0^2 f^2}}} \right)}} \over {\,f^3}}. $$

4. RESULTS AND DISCUSSION

Equation (8) describes the variation in beam width parameter with normalized distance, η where, η = z/R _d and $R_{\rm d} \left( { = {{{\rm \omega} _0 r_0^2} \over c}} \right)$ is the diffraction length. To solve Eq. (8), the following laser–plasma parameters were used: ω ₀ = 1.78 × 10¹⁴, ω _p = 2.5 × 10¹³, Ω = 3 × 10¹³ rad s, T ₀ = 10⁶ K, n _q = 0.3n ₀, intensity of laser beam, I = 10¹⁴ W cm−², and initial radius of the laser beam, r ₀ = 40 μm.

The beam width parameter f is plotted with the distance at different times. Plots are shown in Figures 1a and 1b corresponding to modulation indices μ = 0.05 and 0.1, respectively. The beam self-focuses and defocuses in the course of its propagation and the degree of focusing changes with time. Equation (18) was solved numerically and THz amplitude was evaluated at different times and compared with result obtained without considering the effect of self-focusing (i.e., f = 1). The amplitude was found to be enhanced significantly when self-focusing occurs. Further the enhancement was found to be time dependent as expected because of transient focusing of laser beam. Figure 2 shows schematic representation for THz radiation generation in the presence of ripple density plasma. Figures 3a and 3b exhibit the radial profile of the generated THz field amplitude (corresponding to values of modulation indices μ = 0.05 and 0.1, respectively) at different times for n _q = 0.3n ₀. The peak THz field is obtained at different values of transverse distances at different times. THz amplitude depends upon the generated nonlinear current density which in turn depends on the gradient of intensity of the laser beam. Since the laser beam has the spatial Gaussian profile, the gradient of intensity at the propagation axis is zero. It increases along the radial direction and after attaining the maximum value again starts decreasing. Thus the spatial profile of generated THz amplitude will follow the same trend as shown in Figures 3a and 3b. The line shown in black corresponds to the case without self-focusing [f(z) = 1, i.e., without focusing/defocusing], whereas colored lines correspond to the case with self-focusing at different times. Figures 4a and 4b show the power spectra of generated THz radiation at different times corresponding to the values of modulation indices 0.05 and 0.1, respectively. The lines shown in black and in colors correspond to the cases without and with self-focusing as before. The enhancement in the generated THz amplitude is primarily due to three factors: Modulation index (μ), ripple density amplitude (n _q), and dimensionless beam width parameter (f).

Fig. 1. (a) Variation of beam width parameter with normalized distance along the direction of laser propagation for μ = 0.05. (b) Variation of beam width parameter with normalized distance along the direction of laser propagation for μ = 0.1.

Fig. 2. Schematic representation for THz radiation generation in the presence of ripple density plasma.

Fig. 3. (a) Radial profile of THz amplitude for the parameters same as those used for Figure 1a. (b) Radial profile of THz amplitude for the parameters same as those used for Figure 1b.

Fig. 4. (a) Power spectra of THz radiation for the parameters same as used for Figure 1a. (b) Power spectra of THz radiation for the parameters same as used for Figure 1b.

The efficiency of THz generation that is, the ratio of the energy of the generated THz to the energy of the laser used for the generation, which comes out to be of the order of ~10⁻⁴ for the parameters used. As amplitude of the generated THz depends on μ, n _q, and f, the choice of their values will play an important role in optimizing the conversion efficiency to the best possible value. It is a matter of choosing these parameters as realistically as possible. Some of the best conversion efficiencies reported so far are ~10⁻⁵ (Hamster et al., Reference Hamster, Sullivan, Gordon and Falcon1993), ~5 × 10⁻⁴ (Wang et al., Reference Wang, Kawata, Sheng, Li and Zhang2011), ~10⁻⁴ (Chen, Reference Chen2013b), and ~10⁻⁵ (Wu et al., Reference Wu, Sheng, Dong, Xu and Zhang2007). Thus, the efficiency achieved in the proposed scheme is of the order of those achieved by other researchers using other mechanisms.