TY  - CONF
AU  - Stojanović, Mirjana G.
AU  - Stojanović Krasić, Marija
AU  - Johansson, M.
AU  - Salinas, I.A.
AU  - Vicencio, R.A.
AU  - Stepić, Milutin
PY  - 2022
UR  - https://vinar.vin.bg.ac.rs/handle/123456789/11850
AB  - Flat-band (FB) photonic lattices are attracting substantial attention of researchers
since they provide an excellent platform for studying various fundamental physical
phenomena difficult to achieve in the condensed matter systems. In that regard,
some of those phenomena demonstrated in the last two decade are discrete solitons,
dynamical localization and Anderson localization in disordered lattices [1]. One of
the advantages of photonic lattices is that they are easy to manipulate with. Maybe
the most important property of FBs is that they can host a complete set of compact
localized states (CLS), highly robust to environmental noise.
Here, we investigate the CLS in two-dimensional (2D) dice lattice dressed by artificial flux in the presence of nonlinearity. Due to the Aharonov-Bohm (AB) caging
effect, this lattice can host a fully FB spectrum [2]. The FB eigenmodes are compact
snowflake-like structures shared by a few unit cells [3]. The goal is to find suitable
conditions for selecting the localized states with user-friendly characteristics. We
do this by testing the dynamics of those snowflake-like CLS in the linear and nonlinear regime. We have found two types of dynamics of compact structures, one,
the snowflake-like, robust in both linear and nonlinear regime, and the other one,
breathing complexes, robust only in the presence of weak nonlinearity
C3  - BPU11 : 11th International Conference of the Balkan Physical Union
T1  - Compact localized modes in Dice lattice dressed by artificial flux
VL  - 427
SP  - 146
EP  - 146
UR  - https://hdl.handle.net/21.15107/rcub_vinar_11850
ER  - 

@conference{
author = "Stojanović, Mirjana G. and Stojanović Krasić, Marija and Johansson, M. and Salinas, I.A. and Vicencio, R.A. and Stepić, Milutin",
year = "2022",
abstract = "Flat-band (FB) photonic lattices are attracting substantial attention of researchers
since they provide an excellent platform for studying various fundamental physical
phenomena difficult to achieve in the condensed matter systems. In that regard,
some of those phenomena demonstrated in the last two decade are discrete solitons,
dynamical localization and Anderson localization in disordered lattices [1]. One of
the advantages of photonic lattices is that they are easy to manipulate with. Maybe
the most important property of FBs is that they can host a complete set of compact
localized states (CLS), highly robust to environmental noise.
Here, we investigate the CLS in two-dimensional (2D) dice lattice dressed by artificial flux in the presence of nonlinearity. Due to the Aharonov-Bohm (AB) caging
effect, this lattice can host a fully FB spectrum [2]. The FB eigenmodes are compact
snowflake-like structures shared by a few unit cells [3]. The goal is to find suitable
conditions for selecting the localized states with user-friendly characteristics. We
do this by testing the dynamics of those snowflake-like CLS in the linear and nonlinear regime. We have found two types of dynamics of compact structures, one,
the snowflake-like, robust in both linear and nonlinear regime, and the other one,
breathing complexes, robust only in the presence of weak nonlinearity",
journal = "BPU11 : 11th International Conference of the Balkan Physical Union",
title = "Compact localized modes in Dice lattice dressed by artificial flux",
volume = "427",
pages = "146-146",
url = "https://hdl.handle.net/21.15107/rcub_vinar_11850"
}

Stojanović, M. G., Stojanović Krasić, M., Johansson, M., Salinas, I.A., Vicencio, R.A.,& Stepić, M.. (2022). Compact localized modes in Dice lattice dressed by artificial flux. in BPU11 : 11th International Conference of the Balkan Physical Union, 427, 146-146.
https://hdl.handle.net/21.15107/rcub_vinar_11850

Stojanović MG, Stojanović Krasić M, Johansson M, Salinas I, Vicencio R, Stepić M. Compact localized modes in Dice lattice dressed by artificial flux. in BPU11 : 11th International Conference of the Balkan Physical Union. 2022;427:146-146.
https://hdl.handle.net/21.15107/rcub_vinar_11850 .

Stojanović, Mirjana G., Stojanović Krasić, Marija, Johansson, M., Salinas, I.A., Vicencio, R.A., Stepić, Milutin, "Compact localized modes in Dice lattice dressed by artificial flux" in BPU11 : 11th International Conference of the Balkan Physical Union, 427 (2022):146-146,
https://hdl.handle.net/21.15107/rcub_vinar_11850 .

TY  - JOUR
AU  - Stojanović, Mirjana G.
AU  - Stojanović Krasić, Marija
AU  - Maluckov, Aleksandra
AU  - Johansson, Magnus M.
AU  - Salinas, I. A.
AU  - Vicencio, Rodrigo A.
AU  - Stepić, Milutin
PY  - 2020
UR  - https://vinar.vin.bg.ac.rs/handle/123456789/9664
AB  - We consider a two-dimensional octagonal-diamond network with a fine-tuned diagonal coupling inside the diamond-shaped unit cell. Its linear spectrum exhibits coexistence of two dispersive bands (DBs) and two flat bands (FBs), touching one of the DBs embedded between them. Analogous to the kagome lattice, one of the FBs will constitute the ground state of the system for a proper sign choice of the Hamiltonian. The system is characterized by two different flat-band fundamental octagonal compactons, originating from the destructive interference of fully geometric nature. In the presence of a nonlinear amplitude (on-site) perturbation, the single-octagon linear modes continue into one-parameter families of nonlinear compact modes with the same amplitude and phase structure. However, numerical stability analysis indicates that all strictly compact nonlinear modes are unstable, either purely exponentially or with oscillatory instabilities, for weak and intermediate nonlinearities and sufficiently large system sizes. Stabilization may appear in certain ranges for finite systems and, for the compacton originating from the band at the spectral edge, also in a regime of very large focusing nonlinearities. In contrast to the kagome lattice, the latter compacton family will become unstable already for arbitrarily weak defocusing nonlinearity for large enough systems. We show analytically the existence of a critical system size consisting of 12 octagon rings, such that the ground state for weak defocusing nonlinearity is a stable single compacton for smaller systems, and a continuation of a nontrivial, noncompact linear combination of single compacton modes for larger systems. Investigating generally the different nonlinear localized (noncompact) mode families in the semi-infinite gap bounded by this FB, we find that, for increasing (defocusing) nonlinearity the stable ground state will continuously develop into an exponentially localized mode with two main peaks in antiphase. At a critical nonlinearity strength a symmetry-breaking pitchfork bifurcation appears, so that the stable ground state is single peaked for larger defocusing nonlinearities. We also investigate numerically the mobility of localized modes in this regime and find that the considered modes are generally immobile both with respect to axial and diagonal phase-gradient perturbations.
T2  - Physical Review A
T1  - Localized modes in linear and nonlinear octagonal-diamond lattices with two flat bands
VL  - 102
IS  - 2
SP  - 023532
DO  - 10.1103/PhysRevA.102.023532
ER  - 

@article{
author = "Stojanović, Mirjana G. and Stojanović Krasić, Marija and Maluckov, Aleksandra and Johansson, Magnus M. and Salinas, I. A. and Vicencio, Rodrigo A. and Stepić, Milutin",
year = "2020",
abstract = "We consider a two-dimensional octagonal-diamond network with a fine-tuned diagonal coupling inside the diamond-shaped unit cell. Its linear spectrum exhibits coexistence of two dispersive bands (DBs) and two flat bands (FBs), touching one of the DBs embedded between them. Analogous to the kagome lattice, one of the FBs will constitute the ground state of the system for a proper sign choice of the Hamiltonian. The system is characterized by two different flat-band fundamental octagonal compactons, originating from the destructive interference of fully geometric nature. In the presence of a nonlinear amplitude (on-site) perturbation, the single-octagon linear modes continue into one-parameter families of nonlinear compact modes with the same amplitude and phase structure. However, numerical stability analysis indicates that all strictly compact nonlinear modes are unstable, either purely exponentially or with oscillatory instabilities, for weak and intermediate nonlinearities and sufficiently large system sizes. Stabilization may appear in certain ranges for finite systems and, for the compacton originating from the band at the spectral edge, also in a regime of very large focusing nonlinearities. In contrast to the kagome lattice, the latter compacton family will become unstable already for arbitrarily weak defocusing nonlinearity for large enough systems. We show analytically the existence of a critical system size consisting of 12 octagon rings, such that the ground state for weak defocusing nonlinearity is a stable single compacton for smaller systems, and a continuation of a nontrivial, noncompact linear combination of single compacton modes for larger systems. Investigating generally the different nonlinear localized (noncompact) mode families in the semi-infinite gap bounded by this FB, we find that, for increasing (defocusing) nonlinearity the stable ground state will continuously develop into an exponentially localized mode with two main peaks in antiphase. At a critical nonlinearity strength a symmetry-breaking pitchfork bifurcation appears, so that the stable ground state is single peaked for larger defocusing nonlinearities. We also investigate numerically the mobility of localized modes in this regime and find that the considered modes are generally immobile both with respect to axial and diagonal phase-gradient perturbations.",
journal = "Physical Review A",
title = "Localized modes in linear and nonlinear octagonal-diamond lattices with two flat bands",
volume = "102",
number = "2",
pages = "023532",
doi = "10.1103/PhysRevA.102.023532"
}

Stojanović, M. G., Stojanović Krasić, M., Maluckov, A., Johansson, M. M., Salinas, I. A., Vicencio, R. A.,& Stepić, M.. (2020). Localized modes in linear and nonlinear octagonal-diamond lattices with two flat bands. in Physical Review A, 102(2), 023532.
https://doi.org/10.1103/PhysRevA.102.023532

Stojanović MG, Stojanović Krasić M, Maluckov A, Johansson MM, Salinas IA, Vicencio RA, Stepić M. Localized modes in linear and nonlinear octagonal-diamond lattices with two flat bands. in Physical Review A. 2020;102(2):023532.
doi:10.1103/PhysRevA.102.023532 .

Stojanović, Mirjana G., Stojanović Krasić, Marija, Maluckov, Aleksandra, Johansson, Magnus M., Salinas, I. A., Vicencio, Rodrigo A., Stepić, Milutin, "Localized modes in linear and nonlinear octagonal-diamond lattices with two flat bands" in Physical Review A, 102, no. 2 (2020):023532,
https://doi.org/10.1103/PhysRevA.102.023532 . .

TY  - CONF
AU  - Stojanović, Mirjana G.
AU  - Stojanović Krasić, Marija
AU  - Johansson, M.
AU  - Salinas, I.A.
AU  - Vicencio, R.A.
AU  - Stepić, Milutin
PY  - 2019
UR  - https://vinar.vin.bg.ac.rs/handle/123456789/11849
AB  - Two-dimensional octagonal-diamond (OD) atomic lattices have been explored in recent times to study phenomena related to topological phase transitions induced by spin-orbit interaction and gauge fields [1], and magnetic phases and metal-insulator transitions with Hubbard interaction [2, 3]. It can lead to the appearance of nontrivial nearly flat band states with particular topological properties [4]. Here we study the octagonal-diamond photonic lattice formed of linearly coupled waveguides, proposed by [4] as a possible experimental realization of an artificial flat-band system. We investigated analytically and numerically the existence and stability of linear and nonlinear localized modes in a two-dimensional OD lattice. The primitive cell consists of four sites, linearly coupled with each other with the same coupling constant, including two diagonal couplings. The eigenvalue spectrum of the linear lattice consists of two flat bands and two dispersive bands [4]. The upper dispersive band intersects the upper flat band in the middle of the Brillouin zone, as well as the second flat band at the end of the Brillouin zone. In the linear case, there are two types of localized linear solutions, which are composed of eight sites each, having either monomer (+ - + - + - + -) or dimer (+ + - - + + - -) staggered phase structure [4]. In the presence of Kerr nonlinearity, both focusing and defocusing, compacton-like solutions [5] may exhibit instabilities due to intersections of the upper dispersive band and the flat bands. We also discuss the possibility of finding soliton solutions in the frequency gaps occurring between the flat bands and the isolated dispersive bands.
PB  - Belgrade : Vinča Institute of Nuclear Sciences, University of Belgrade
C3  - PHOTONICA2019 : 7th International School and Conference on Photonics & Machine Learning with Photonics Symposium : Book of abstracts
T1  - Localized modes in two-dimensional octagonal-diamond lattices
SP  - 93
EP  - 93
UR  - https://hdl.handle.net/21.15107/rcub_vinar_11849
ER  - 

@conference{
author = "Stojanović, Mirjana G. and Stojanović Krasić, Marija and Johansson, M. and Salinas, I.A. and Vicencio, R.A. and Stepić, Milutin",
year = "2019",
abstract = "Two-dimensional octagonal-diamond (OD) atomic lattices have been explored in recent times to study phenomena related to topological phase transitions induced by spin-orbit interaction and gauge fields [1], and magnetic phases and metal-insulator transitions with Hubbard interaction [2, 3]. It can lead to the appearance of nontrivial nearly flat band states with particular topological properties [4]. Here we study the octagonal-diamond photonic lattice formed of linearly coupled waveguides, proposed by [4] as a possible experimental realization of an artificial flat-band system. We investigated analytically and numerically the existence and stability of linear and nonlinear localized modes in a two-dimensional OD lattice. The primitive cell consists of four sites, linearly coupled with each other with the same coupling constant, including two diagonal couplings. The eigenvalue spectrum of the linear lattice consists of two flat bands and two dispersive bands [4]. The upper dispersive band intersects the upper flat band in the middle of the Brillouin zone, as well as the second flat band at the end of the Brillouin zone. In the linear case, there are two types of localized linear solutions, which are composed of eight sites each, having either monomer (+ - + - + - + -) or dimer (+ + - - + + - -) staggered phase structure [4]. In the presence of Kerr nonlinearity, both focusing and defocusing, compacton-like solutions [5] may exhibit instabilities due to intersections of the upper dispersive band and the flat bands. We also discuss the possibility of finding soliton solutions in the frequency gaps occurring between the flat bands and the isolated dispersive bands.",
publisher = "Belgrade : Vinča Institute of Nuclear Sciences, University of Belgrade",
journal = "PHOTONICA2019 : 7th International School and Conference on Photonics & Machine Learning with Photonics Symposium : Book of abstracts",
title = "Localized modes in two-dimensional octagonal-diamond lattices",
pages = "93-93",
url = "https://hdl.handle.net/21.15107/rcub_vinar_11849"
}

Stojanović, M. G., Stojanović Krasić, M., Johansson, M., Salinas, I.A., Vicencio, R.A.,& Stepić, M.. (2019). Localized modes in two-dimensional octagonal-diamond lattices. in PHOTONICA2019 : 7th International School and Conference on Photonics & Machine Learning with Photonics Symposium : Book of abstracts
Belgrade : Vinča Institute of Nuclear Sciences, University of Belgrade., 93-93.
https://hdl.handle.net/21.15107/rcub_vinar_11849

Stojanović MG, Stojanović Krasić M, Johansson M, Salinas I, Vicencio R, Stepić M. Localized modes in two-dimensional octagonal-diamond lattices. in PHOTONICA2019 : 7th International School and Conference on Photonics & Machine Learning with Photonics Symposium : Book of abstracts. 2019;:93-93.
https://hdl.handle.net/21.15107/rcub_vinar_11849 .

Stojanović, Mirjana G., Stojanović Krasić, Marija, Johansson, M., Salinas, I.A., Vicencio, R.A., Stepić, Milutin, "Localized modes in two-dimensional octagonal-diamond lattices" in PHOTONICA2019 : 7th International School and Conference on Photonics & Machine Learning with Photonics Symposium : Book of abstracts (2019):93-93,
https://hdl.handle.net/21.15107/rcub_vinar_11849 .

TY  - JOUR
AU  - Hermann-Avigliano, Carla
AU  - Salinas, I A
AU  - Rivas, D. A.
AU  - Real, Bastian
AU  - Mančić, Ana
AU  - Mejía-Cortés, Cristian
AU  - Maluckov, Aleksandra
AU  - Poblete, Rodrigo Andres Vicencio
PY  - 2019
UR  - https://www.osapublishing.org/abstract.cfm?URI=ol-44-11-2807
UR  - https://vinar.vin.bg.ac.rs/handle/123456789/8223
AB  - We report on the excitation of large-amplitude waves, with a probability of around 1% of total peaks, on a photorefractive SBN crystal by using a simple experimental setup at room temperature. We excite the system using a narrow Gaussian beam and observe different dynamical regimes tailored by the value and time rate of an applied voltage. We identify two main dynamical regimes: a caustic one for energy spreading and a speckling one for peak emergence. Our observations are well described by a two-dimensional Schrödinger model with saturable local nonlinearity. © 2019 Optical Society of America.
T2  - Optics Letters
T1  - Spatial rogue waves in photorefractive SBN crystals
VL  - 44
IS  - 11
SP  - 2807
DO  - 10.1364/OL.44.002807
ER  - 

@article{
author = "Hermann-Avigliano, Carla and Salinas, I A and Rivas, D. A. and Real, Bastian and Mančić, Ana and Mejía-Cortés, Cristian and Maluckov, Aleksandra and Poblete, Rodrigo Andres Vicencio",
year = "2019",
abstract = "We report on the excitation of large-amplitude waves, with a probability of around 1% of total peaks, on a photorefractive SBN crystal by using a simple experimental setup at room temperature. We excite the system using a narrow Gaussian beam and observe different dynamical regimes tailored by the value and time rate of an applied voltage. We identify two main dynamical regimes: a caustic one for energy spreading and a speckling one for peak emergence. Our observations are well described by a two-dimensional Schrödinger model with saturable local nonlinearity. © 2019 Optical Society of America.",
journal = "Optics Letters",
title = "Spatial rogue waves in photorefractive SBN crystals",
volume = "44",
number = "11",
pages = "2807",
doi = "10.1364/OL.44.002807"
}

Hermann-Avigliano, C., Salinas, I. A., Rivas, D. A., Real, B., Mančić, A., Mejía-Cortés, C., Maluckov, A.,& Poblete, R. A. V.. (2019). Spatial rogue waves in photorefractive SBN crystals. in Optics Letters, 44(11), 2807.
https://doi.org/10.1364/OL.44.002807

Hermann-Avigliano C, Salinas IA, Rivas DA, Real B, Mančić A, Mejía-Cortés C, Maluckov A, Poblete RAV. Spatial rogue waves in photorefractive SBN crystals. in Optics Letters. 2019;44(11):2807.
doi:10.1364/OL.44.002807 .

Hermann-Avigliano, Carla, Salinas, I A, Rivas, D. A., Real, Bastian, Mančić, Ana, Mejía-Cortés, Cristian, Maluckov, Aleksandra, Poblete, Rodrigo Andres Vicencio, "Spatial rogue waves in photorefractive SBN crystals" in Optics Letters, 44, no. 11 (2019):2807,
https://doi.org/10.1364/OL.44.002807 . .

TY  - CONF
AU  - Poblete, Rodrigo Andres Vicencio
AU  - Salinas, I. A.
AU  - Hermann-Avigliano, Carla
AU  - Rivas, D. A.
AU  - Real, Bastian
AU  - Mejía-Cortés, Cristian
AU  - Mančić, Ana
AU  - Maluckov, Aleksandra
PY  - 2018
UR  - https://www.osapublishing.org/abstract.cfm?URI=LAOP-2018-W2E.4
UR  - https://vinar.vin.bg.ac.rs/handle/123456789/8020
AB  - We report on the excitation of large-amplitude waves, with very low probability, in photorefractive SBN crystals. We excite the system with a narrow gaussian beam and observe different dynamical regimes tailored by the crystal nonlinearity. © 2018 The Author (s)
C3  - Latin America Optics and Photonics Conference
T1  - Rogue Waves in Photorefractive SBN Crystals
VL  - Part F123-LAOP 2018
SP  - W2E.4
DO  - 10.1364/LAOP.2018.W2E.4
ER  - 

@conference{
author = "Poblete, Rodrigo Andres Vicencio and Salinas, I. A. and Hermann-Avigliano, Carla and Rivas, D. A. and Real, Bastian and Mejía-Cortés, Cristian and Mančić, Ana and Maluckov, Aleksandra",
year = "2018",
abstract = "We report on the excitation of large-amplitude waves, with very low probability, in photorefractive SBN crystals. We excite the system with a narrow gaussian beam and observe different dynamical regimes tailored by the crystal nonlinearity. © 2018 The Author (s)",
journal = "Latin America Optics and Photonics Conference",
title = "Rogue Waves in Photorefractive SBN Crystals",
volume = "Part F123-LAOP 2018",
pages = "W2E.4",
doi = "10.1364/LAOP.2018.W2E.4"
}

Poblete, R. A. V., Salinas, I. A., Hermann-Avigliano, C., Rivas, D. A., Real, B., Mejía-Cortés, C., Mančić, A.,& Maluckov, A.. (2018). Rogue Waves in Photorefractive SBN Crystals. in Latin America Optics and Photonics Conference, Part F123-LAOP 2018, W2E.4.
https://doi.org/10.1364/LAOP.2018.W2E.4

Poblete RAV, Salinas IA, Hermann-Avigliano C, Rivas DA, Real B, Mejía-Cortés C, Mančić A, Maluckov A. Rogue Waves in Photorefractive SBN Crystals. in Latin America Optics and Photonics Conference. 2018;Part F123-LAOP 2018:W2E.4.
doi:10.1364/LAOP.2018.W2E.4 .

Poblete, Rodrigo Andres Vicencio, Salinas, I. A., Hermann-Avigliano, Carla, Rivas, D. A., Real, Bastian, Mejía-Cortés, Cristian, Mančić, Ana, Maluckov, Aleksandra, "Rogue Waves in Photorefractive SBN Crystals" in Latin America Optics and Photonics Conference, Part F123-LAOP 2018 (2018):W2E.4,
https://doi.org/10.1364/LAOP.2018.W2E.4 . .