Third harmonic generation at 223 nm in the metallic regime of GaP

Roppo, Vito; Foreman, John V.; Aközbek, Neşet; Vincenti, Maria Antonietta; Scalora, Michael

doi:10.1063/1.3565240

Cited by 22 publications

(37 citation statements)

References 15 publications

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“…In Refs. [15,18] the technique was extended to include the effects of second-and third-order nonlinearities of materials like GaP and GaAs, which have anisotropic χ (2) and χ (3) tensors. Therefore, the methods are quite general and can handle vector field propagation in two dimensions and time.…”

Section: Nonlinear Results For a Representative Lorentz-type Mediummentioning

confidence: 99%

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Singularity-driven second- and third-harmonic generation atε-near-zero crossing points

et al. 2011

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We show an alternative path to efficient second-and third-harmonic generation in proximity of the zero crossing points of the dielectric permittivity in conjunction with low absorption. Under these circumstances, any material, either natural or artificial, will show similar degrees of field enhancement followed by strong harmonic generation, without resorting to any resonant mechanism. The results presented in this paper provide a general demonstration of the potential that the zero-crossing-point condition holds for nonlinear optical phenomena. We investigate a generic Lorentz medium and demonstrate that a singularity-driven enhancement of the electric field may be achieved even in extremely thin layers of material. We also discuss the role of nonlinear surface sources in a realistic scenario where a 20-nm layer of CaF 2 is excited at 21 μm, where ε ∼ 0. Finally, we show similar behavior in an artificial composite material that includes absorbing dyes in the visible range, provide a general tool for the improvement of harmonic generation using the ε ∼ 0 condition, and illustrate that this singularity-driven enhancement of the field lowers the thresholds for a plethora of nonlinear optical phenomena.

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Section: Nonlinear Results For a Representative Lorentz-type Mediummentioning

confidence: 99%

“…This new theoretical aspect that pertains to the ε ∼ 0 condition is modeled by explicitly including electric and magnetic forces, as outlined in Refs. [15,16,18]. We consider the simple case of a 20-nm-thick layer of uniform, Lorentz-type medium.…”

Section: Introductionmentioning

confidence: 99%

Singularity-driven second- and third-harmonic generation atε-near-zero crossing points

et al. 2011

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“…This effect can be understood as inhibition of absorption at the harmonic wavelength for the INH component. Although one might be tempted to think that the INH SH is constantly being replenished by the pump, our simulations show, and experiments suggest [15,16], that pulses travel very long distances (hundreds of thousands of absorption lengths) May 15, 2011 / Vol. 36, No.…”

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confidence: 93%

Enhanced efficiency of the second harmonic inhomogeneous component in an opaque cavity

Roppo

Raineri²,

Raj³

et al. 2011

Opt. Lett.

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In this Letter, we experimentally demonstrate the enhancement of the inhomogeneous second harmonic conversion in the opaque region of a GaAs cavity with efficiencies of the order of 0.1% at 612 nm, using 3 ps pump pulses having peak intensities of the order of 10 MW=cm 2 . We show that the conversion efficiency of the inhomogeneous, phase-locked second harmonic component is a quadratic function of the cavity factor Q. © 2011 Optical Society of America OCIS codes: 190.2620, 190.5530. Second harmonic generation (SHG) [1][2][3] is perhaps the most studied nonlinear optical phenomenon. When a fundamental field (FF) impinges on a χ ð2Þ material, the resulting polarization is a quadratic function of the field. The generated second harmonic (SH) signal has a carrier frequency that doubles the FF one. Even though the general solution of a problem that includes dispersion and absorption is rather complicated, it is possible to derive approximate solutions that elucidate shape and behavior of the generated SH [1]. The general solution of an inhomogeneous (INH) set of differential equations consists of two parts: the first is the solution of the homogeneous (HOM) equations, the second is a particular solution of the INH system. The former (HOM SH) has a well-known expression, and its behavior and efficiency have been investigated extensively, especially under phase matching conditions, i.e., the fields propagate with the same phasevelocity [4][5][6]. The latter (INH SH) does not have an exact or unique form. The INH solution manifests itself under phase-mismatched conditions with conversion efficiencies smaller than the phase-matched case. This is why the study of the INH SH has generated very little interest.During the last few decades, relatively few studies have reported this twofold nature of the generated SH signal, aspect that gives rise to Maker fringes [7,8] and a double-peaked SH signal shape [9][10][11]. Nevertheless, efforts have remained focused on studying phasematched SHG to ensure maximum conversion efficiency. As we will see later [12], in uniform media, only the HOM SH component can be enhanced, a situation that makes the INH SH component more difficult to observe.This relative lack of knowledge regarding the dynamics of pulses generated in the mismatched regime and the availability of laser sources with ever decreasing pulse durations made it necessary that a systematic investigation of the INH SH be undertaken [12,13]. Since it is not an easy task to glean its properties from the implicit form of the analytical solution, one has to rely on numerical studies. In [12,13], the dynamics of the INH SH component is discussed in some detail. This component of the SH is always present during propagation and travels bound to the FF with the same velocity. Once generated within the first few coherence lengths, as the pump pulse traverses the entry interface, the SH energy clamps with no further energy exchange with the pump pulse. Even under phase-mismatched conditions, the carrier wave vector of the trapped I...

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“…Moreover, we stress that the size of the nanoslits carved in the GaAs layer is well below the cutoff for TE-polarized SH and TH. This means that all the TE generated fields are in fact generated only thanks to the phase locking that takes place between the pump and its harmonics, allowing generation even under extremely high absorption condition [18][19][20].…”

Section: Nonlinear Resultsmentioning

confidence: 98%

“…We demonstrate that harmonic components undergo band gap effects related to the pump wavelength and its harmonics, showing how phase locking [14][15][16] indeed allows the propagation, generation and transmission of light even below cutoff for the sub-wavelength guide and even under extremely high absorption condition [17][18][19][20].…”

Section: Introductionmentioning

confidence: 97%

Second and third harmonic generation at UV and soft x-ray wavelengths from semiconductor gratings

2011

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Extraordinary transmission properties are demonstrated in the UV range for GaAs gratings with sub-wavelength apertures under TM-polarization excitation. The metal-like response below 270nm, typical of several semiconductors such as GaAs or GaP, in fact may be used to excite surface waves that lead to enhance transmission in the linear regime and for novel nonlinear optical phenomena in the UV and soft X-ray ranges. An investigation of the linear transmission as a function of geometrical parameters of the grating reveals the formation of surface waves and relatively high transmission values even in regimes where the nominal absorption is significant. Strong field localization in subwavelength cavities and on the surface of the grating can be achieved under proper excitation conditions leading to the enhancement of harmonic generation. Nonlinear contributions to harmonic generation arise from symmetry breaking, the nonlinear magnetic Lorentz force, and from intrinsic, dipolar volume contributions. Preliminary results show promising nonlinear conversion efficiencies at wavelengths below 100nm, and demonstrate cross-coupling of TE and TM polarizations for pump and harmonic signals. A down-conversion process that can re-generate pump photons of polarization orthogonal compared to the incident pump field is also demonstrated.

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Third harmonic generation at 223 nm in the metallic regime of GaP

Cited by 22 publications

References 15 publications

Singularity-driven second- and third-harmonic generation atε-near-zero crossing points

Singularity-driven second- and third-harmonic generation atε-near-zero crossing points

Enhanced efficiency of the second harmonic inhomogeneous component in an opaque cavity

Second and third harmonic generation at UV and soft x-ray wavelengths from semiconductor gratings

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