1.1.

Light-Induced Interaction between Surface Optical Modes and a TLD Film

The set of coupled governing equations that describes light–fluid interaction due to TLD film thickness changes includes Maxwell equations, Navier–Stokes equations for an incompressible Newtonian fluid, balance condition between viscous and surface tension stresses on the gas–fluid (or fluid–fluid) interface, and heat/mass-transport equations depending on the specific light-induced mechanism, which triggers local changes of the surface tension. We employ heat-transport and mass-transport equations, relevant for the TC effect and SC effect, respectively, which constitute the coupling mechanism between light propagation and dynamics of TLD film. Specifically, light-induced changes of the surface tension lead to deformation of the TLD film, $\eta ({\overrightarrow{r}}_{\parallel },t)$, which in turn is coupled back to the propagation of light due to the associated spatial changes of the dielectric function, $\mathrm{\Delta }{ϵ}_D$, which in the leading order of $\eta /h_0$ is given as³⁶

For the case of SC flows, we focus on cis–trans transformation that can be described by the simple phenomenological two-state model $A\underset{k_{\mathrm{off}}}{\overset{k_{\mathrm{on}}}{\rightleftharpoons }}B$, where $c_{A,B}$ stands for the molar concentration of the corresponding photoactive molecule in the cis/trans states $A$ and $B$, respectively. Assuming linear dependence of the surface tension $\sigma$, with respect to small changes of $c_{A,B}$, and furthermore assuming for simplicity that both species admit identical molecular diffusion coefficients $D$ and similar affinity to the gas–fluid interface, leads to the following nonlocal relation between the deformation $\eta$ and the optical power $I$, which is similar to the relation Eq. (2) relevant to the TC case discussed above (see the Supplemental Material for derivation):

Employing a perturbative expansion for the SPP and slab WG modes (see the Supplemental Material), which incorporates the effects of diffraction and gain, yields the following complex nonlocal Ginzburg–Landau (GL) equation (see the Supplemental Material for derivation):

1.2.

One-Dimensional and Two-Dimensional Optical Liquid Lattices with Tunable Symmetry

Next we show that by controlling the interference pattern of surface optical modes, it is possible to form optical liquid lattices directly from a TLD film and tune their symmetries. Consider an interference of $N$-plane waves of real-valued amplitudes $a_n$ that propagate in the $y-z$ plane along the directions formed by angles ${\theta }_n$, which are measured relative to the positive direction of the $y$ axis. The corresponding wave vectors are given by ${\overrightarrow{k}}_n=k_0[\cos ({\theta }_n),\sin ({\theta }_n)]$, where $k_0=2\pi /\lambda$ and $\lambda$ are the effective wavelength that is set by the relevant frequency and the corresponding dispersion relation; i.e., for SPP or WG mode, the wavelength is given by $\lambda ={\lambda }_0/n$, where ${\lambda }_0$ is the vacuum wavelength and $n$ is the corresponding effective refractive index. The resultant optical intensity $I$ due to interference of the plane waves $a_n{e}^{i{\overrightarrow{k}}_n·{\overrightarrow{r}}_{\parallel }}$ is then given as

First, consider the simplest $N=2$ case that leads to a 1-D optical liquid lattice. The intensity distribution of two optical plane waves of equal intensity $I_0$ propagating along the $y-z$ plane with wave vectors ${\overrightarrow{k}}_{\pm }=k[\pm \cos (\theta ),\sin (\theta )]$ [see Fig. 2(a)] is given by $2I_0\{1+\cos [K(\theta )]x\}$, which upon inserting into Eq. (2) yields the corresponding 1-D deformation of the TLD film:

Fig. 2

Optical liquid lattices formed from a TLD film due to interference of SPPs or WG plane wave modes with propagating direction marked with red arrows. (a) One-dimensional lattice formed by interference of two surface optical plane waves with $\theta$-dependent periodicity given by Eq. (6). (b)–(d) Two-dimensional lattices of hexagonal symmetry and (e)–(g) rectangular symmetry, where ${\overrightarrow{V}}_1$ and ${\overrightarrow{V}}_2$ are the corresponding primitive vectors. The symmetry of the liquid lattice and can be controlled by the relative angles of the interfering beams; (b) $\theta =30\mathrm{deg}$ and (c) $\theta =45\mathrm{deg}$ are lattices with hexagonal broken/distorted symmetry, whereas (d) $\theta =60\mathrm{deg}$ is hexagonal symmetric lattice; (e) $\alpha =0\mathrm{deg}$ (square symmetry), (f) $\alpha =10\mathrm{deg}$, and (g) $\alpha =20\mathrm{deg}$ correspond to rectangular symmetry. (h), (i) Optical liquid lattice for different values of $q$ which results in (d) a phase transition from a hexagonal lattice to (h) merging of the triangular sites and (i) face-centered cubic lattice. The 2-D liquid lattices are normalized by ${\eta }_{\max }$ and ${\eta }_{\min }\equiv -{\eta }_{\max }$ defined in Eq. (9) and below Eq. (11).

Next, we consider the case $N=3$, which leads to a 2-D symmetric liquid lattice, where the relative amplitudes of the three beams satisfy $a_1=a_2=a_3/q\equiv a$, where $a$ and $q$ are real constants and assume the corresponding propagation directions are given by ${\widehat{n}}_1=[\cos (\theta ),-\sin (\theta )]$, ${\widehat{n}}_2=-[\cos (\theta ),\sin (\theta )]$, ${\widehat{n}}_3=(\mathrm{0,1})$ (which can be also written as ${\theta }_n=(n+1)\pi +(-1{)}^n\theta$ for $n=\mathrm{0,1}$ and ${\theta }_2=\pi /2$). Inserting the corresponding intensity distribution (see the Supplemental Material) into Eq. (2) yields the following TLD film deformation:

Expanding the deformation given by Eq. (7) up to a second-order in Taylor series around one of the maximum points [e.g., $(\mathrm{\Delta }y/\mathrm{3,0})$] yields a harmonic oscillator potential that admits a degree of anisotropy given by $3(\mathrm{\Delta }z/\mathrm{\Delta }y{)}^2$, which is a monotonic decreasing function of $\theta$. In particular, the case $\theta =\pi /6$, i.e., when the relative angles between the interfering plane waves all equal to $2\pi /3$, the degree of anistropy equals to unity and the fluid deformation admits a hexagonal symmetry. Values of $\theta$, which differ from $\pi /6$, result in a fluid deformation with a distorted unit cell and of broken hexagonal symmetry. Interestingly, the unit cell area $\mathrm{\Delta }y·\mathrm{\Delta }z/2$ is not preserved under changes of the interfering plane-waves’ relative angle, and the minimal unit cell area corresponds to $\theta =\pi /6$. Figures 2(b)–2(d) show a fluid deformation described by Eq. (7) for the values $\theta =\pi /6$, $\theta =\pi /4$, and $\theta =\pi /3$, respectively. Other values of the parameter $q$, which are close to $q=\bar{q}$, can be used to control fluid distribution within each unit cell. Values of $q$, which differ significantly from $q=\bar{q}$ can be employed to trigger phase transition of the fluid lattice. In particular, increasingly smaller values of $q$ (i.e., larger $a_{\mathrm{1,2}}/a_3$) and fixed propagation directions, which do not modify $\mathrm{\Delta }y$ and $\mathrm{\Delta }z$ lead to change of the fluid deformation symmetry from hexagonal, which is composed of two equivalent interpenetrating triangular Bravais lattices that admit two primitive vectors ${\overrightarrow{V}}_{\mathrm{1,2}}$ and and two cites per unit cell,⁵¹ to a face centered cubic symmetry with one primitive vector per unit cell. Figures 2(d), 2(h), and 2(i) show TLD film deformation for the case $\theta =\pi /6$ and successively smaller values of $q$ leading to merging of fluid peaks (blue) within each cell and a phase transition from hexagonal lattice to a lattice with centered cubic symmetry.

A liquid lattice with a rectangular tunable symmetry can be formed by interfering four beams where the relative amplitudes satisfy $a_{\mathrm{0,2}}=qa$, $a_{\mathrm{1,3}}=a$ and the propagation angles are given by ${\theta }_n=(1+2n)\pi /4+(-1{)}^n\alpha$ ($n=\mathrm{0,1},\mathrm{2,3}$), where $\alpha$ is a real parameter. Inserting the corresponding intensity (see the Supplemental Material) into Eq. (2) yields the following TC-driven deformation of the TLD film:

1.3.

Self-Induced Distributed Feedback Lasing in 1-D Optical Liquid Lattices

The self-induced 1-D deformation of the TLD film given by Eq. (6) [see also Fig. 2(a)] leads to a periodic modulation of the depth-averaged refractive index for the corresponding surface optical modes, which triggers a self-induced selection mechanism. The latter singles out a set of potential lasing modes that satisfy the minimum phase or the $q$’th-order Bragg resonant condition, given as

Note that, similar to other self-induced lasing mechanisms,⁵⁴ the field intensity plays a double role; it determines both the coupling constant^55,56 of the backward Bragg scattering (which provides the feedback mechanism) as well as the pump intensity necessary for lasing. Nevertheless, in our case, the amplitude of the optically induced periodic liquid lattice and consequently the coupling between the right- and the left-propagating modes is a more pronounced function of the optical intensity due to the higher difference between the typical refractive indices of liquids and gases. Notably, the relatively low optical power needed to introduce index changes induced by the TC/SC gas–liquid interface deformation [see Ref. 36, below Eq. (13) for the TC case] is expected to lead to substantially lower lasing threshold as compared to a thick liquid film or a liquid without gas–liquid interface (e.g., liquid fully occupying a microchannel), where the liquid–light interaction due to interface deformation is expected to be absent. In particular, in the absence of gas–liquid interface, index changes in liquids mostly stem from changes of polarizability, population of the electronic states (see Ref. 50 and references within), and material density; for instance, the index change due to thermo-optical effect, $\mathrm{\Delta }{n}_{\mathrm{TO}}$, is given by $\mathrm{\Delta }{n}_{\mathrm{TO}}={\alpha }_{\mathrm{TO}}\mathrm{\Delta }T$, where $\mathrm{\Delta }T$ is a temperature change and ${\alpha }_{\mathrm{TO}}$ is the thermo-optical coefficient, which is typically of the following order of magnitude ${\alpha }_{\mathrm{TO}}={10}^{-4}{\mathrm{K}}^{-1}$. In the case of TC effect, the corresponding index change driven by identical temperature difference is given by $\mathrm{\Delta }{n}_{\mathrm{TC}}={\alpha }_{\mathrm{TC}}\mathrm{\Delta }T$, where ${\alpha }_{\mathrm{TC}}=\frac{3{\sigma }_T{d}_z^2}{2{\sigma }_0{h}_0^2{\pi }^2}\frac{{(n-1/2)}^2}{n^4}$ and $n$ is the integer indicating the numbers of optical periods that fit into the slot (see the Supplemental Material for derivation). Inserting the typical numbers used below Eq. (6) and taking $n=20$, we learn that ${\alpha }_{\mathrm{s}}=187.6$. The latter indicates that under similar temperature change, the amplitude of the periodically induced index and consequently also the coupling coefficient between the counter propagating modes (which directly determines the lasing threshold) is significantly higher for the TC case.

In the limit of small deformation and small intensity, the corresponding coupling constant can be written as $\kappa ={\kappa }_0{I}_0$, where ${\kappa }_0$ is the constant of proportionality given as

1.4.

Bandstructure of WG and SPP Modes in Hexagonal and Rectangular Liquid Lattices

Consider the case of interferring plane waves of the type presented in Eq. (5), which interact via nonlocal and nonlinear integral term in Eq. (4). Representing the intensity distribution given by Eq. (5) as a linear superposition of elements in the ${\phi }_{m,n}$ basis and employing orthogonality of these basis functions leads to the following dispersion relation:

To get an insight into light propagation in a hexagonal crystal, one usually adopts the tight binding approximation,⁵⁷ which describes the dynamics of light as hopping between nearest lattice sites. This approximation is applicable to cases when the potential well at each site is sufficiently deep, leading to localized intensity of the Bloch modes around the sites. For instance, one could in principle expand the potential Eq. (17) around the peak up to second-order,⁵⁷ and then approximate it by the exponential function, to obtain closed-form expressions for the orbitals as a function of the constant $V_0$ (see the Supplemental Material). Since the 2-D hexagonal fluidic lattice admits two sites per one unit cell, the corresponding Wannier function is a linear combination of the two associated orbitals. By taking the continuous limit of the discrete system,⁵⁷ the Schrödinger equation around high symmetry points in the k-space can be represented as a pair of Dirac equations. ⁵⁸ The latter implies the presence of a Dirac point around the corresponding high symmetry points (which usually appears around $K$ points), though it may also emerge in the inner regions of the Brillouin zone.

To determine the dispersion relation for SPP or slab WG modes in the regime that is not satisfied by the tight binding approximation and captures the effect of broken hexagonal and cubic symmetries, we turn to numerical simulations. Figure 3 presents simulation results of the bandstructure for three interfering beams, with angles $\theta =\pi /6$, $\pi /4$, and $\pi /3$, which led to a formation of the suspended TLD film configuration [shown in Fig. 1(b)] with fluid topography shown in Figs. 2(a)–2(c), respectively. Interestingly, optical liquid lattice with increasingly higher broken hexagonal symmetry, due to modified interference pattern, shows emergence of Dirac points for the case $\theta =\pi /4$ and $\theta =\pi /3$, i.e., regions with linear dispersion relation, which do not appear in the case $\theta =\pi /6$. The latter shows formation of two Dirac points [marked with black arrows in Figs. 3(c) and 3(f)] and admits the values 352.3 and 354.3 THz for TE mode and 350.9 and 347.4 THz for the TM mode. Notably, while Dirac cones are known to emerge in all-dielectric, solid-made, and nonreconfigurable setups, in our setup they emerge in reconfigurable optical liquid lattices. In particular, taking advantage of the compliant property of the liquid film allows position tuning of the Dirac points under optically induced surface tension stresses, which is markedly different than other recently suggested mechanisms to control topological properties of light in liquids, such as electrical tunability of liquid crystals.⁵⁹

Fig. 3

Numerical simulation results presenting the bandstructure of photonic slab WG modes (i.e., frequency as a function of the corresponding directions in the k-space) formed in a suspended photonic liquid lattice of hexagonal symmetry and hexagonal broken symmetry. (a)–(c) Bandstructure of TE slab WG modes in a suspended photonic liquid lattice presented in Figs. 1(b)–1(d) due to interference formed by three plane waves at angles (a) $\theta =\pi /6$, (b) $\pi /4$, and (c) $\pi /3$. (d)–(f) Bandstructure of TM slab WG modes at interference angles (d) $\theta =\pi /6$, (e) $\pi /4$, and (f) $\pi /3$. Two Dirac points emerge at the angle $\theta =\pi /3$ at frequencies around 353 and 349 THz, respectively, marked at (c) and (f) by black arrows. In the simulation, the refractive index is 1.409, the mean TLD film thickness is 450 nm, and the peak-to-peak undulation amplitude is 300 nm.

1.5.

Self-Induced Distributed Feedback Lasing and Tuning in Two-Dimensional Liquid Lattices

Figure 4 shows simulation results of the lasing frequencies and the corresponding wave vectors in the k-space, within plasmonic and suspended photonic liquid lattices of tunable symmetry formed by interfering surface optical waves described by angles $\theta$ and $\alpha$, described in Fig. 2. Figure 4(a) presents lasing frequencies of slab WG TE and TM modes (blue and red circles, respectively) in suspended photonic liquid lattices for several values of the interference angle $\theta$, as well as lasing frequencies of SPP modes propagating within plasmonic liquid lattices formed by four interfering SPPs with a relative interference angle set by $\alpha$ (red squares). Interestingly, unlike the 1-D case, the lasing frequency is not a monotonic function of the relative angle between the interfering waves. For simplicity, in our simulations, the laser material is set as a linear gain Lorentz model,⁶⁰ described by a dielectric function given by $ϵ(f)={\epsilon }_l+{\epsilon }_L{\omega }_0^2/[{\omega }_0^2-4\pi i{\delta }_{0}f-{(2\pi f)}^2]$ with resonance frequency centered at ${\omega }_0/(2\pi )=374.97\mathrm{THz}$ (800 nm), liquid permittivity ${\epsilon }_l=n_l^2={(1.409)}^2=1.9852$, Lorentz linewidth $\delta /(2\pi )=52.521\mathrm{THz}$, and Lorentz permittivity ${\epsilon }_L=-0.0075$; the metal is taken as gold.

Fig. 4

Numerical simulation results presenting lasing frequencies tuning in plasmonic liquid lattice and suspended photonic liquid lattice, of hexagonal and rectangular symmetries, respectively, where the angles of the interfering “writing beams” $\alpha$ and $\theta$ are described in Fig. 2. (a) Lasing frequencies tuning of WG TE and TM modes for hexagonal symmetric photonic liquid lattice with $\theta$ values $\theta =45\mathrm{deg}$, 48 deg, 51 deg, 54 deg, 57 deg, and 60 deg (in radians) labeled as 1 to 6 near the blue and red disks, respectively; SPP modes in rectangular symmetric plasmonic liquid lattice with $\alpha$ values $\alpha =0\mathrm{deg}$, 5 deg, 10 deg, 15 deg, and 20 deg, labeled as 1 to 5 near the red squares, respectively. (b) The location of the corresponding lasing modes in the reduced Brillouin zone in the k-space.