- See also my Google Scholar homepage.
- M. Iskin, “Extracting quantum-geometric effects from Ginzburg-Landau theory in a multiband Hubbard model”; see also arXiv:2304.03613.
- M. Iskin, “Topological two-body bands in a multiband Hubbard model”; see also arXiv:2304.xx.
- M. Iskin, “Quantum-geometric contribution to the Bogoliubov modes in a two-band Bose-Einstein condensate”; Phys. Rev. A 107, 023313 (2023); see also arXiv:2210.15408.
- M. Iskin and A. Keleş, “Dimers, trimers, tetramers, and other multimers in a multiband Bose-Hubbard model”; Phys. Rev. A 106, 043315 (2022); see also arXiv:2208.01429.
- M. Iskin and A. Keleş, “Stability of (N+1)-body fermion clusters in a multiband Hubbard model”; Phys. Rev. A 106, 033304 (2022); see also arXiv:2204.10003.
- M. Iskin, “Three-body problem in a multiband Hubbard model”; Phys. Rev. A 105, 063310 (2022); see also arXiv:2201.13139.
- A. L. Subaşı and M. Iskin, “Quantum-geometric perspective on spin-orbit-coupled Bose superfluids”; Phys. Rev. A 105, 023301 (2022); see also arXiv:2110.01385.
- M. Iskin, “Effective-mass tensor of the two-body bound states and the quantum-metric tensor of the underlying Bloch states in multiband lattices”; Phys. Rev. A 105, 023312 (2022); see also arXiv:2109.06000.
- M. Iskin, “Two-body problem in a multiband lattice and the role of quantum geometry”; Phys. Rev. A 103, 053311 (2021); see also arXiv:2102.03530.
- M. Iskin, “Atom-dimer and dimer-dimer scatterings in a spin-orbit-coupled Fermi gas”; Phys. Rev. A 103, 023337 (2021); see also arXiv:2102.06730.
- M. Iskin, “Transverse spin polarization of a Rashba-Zeeman-coupled Fermi superfluid”; Physica B 615, 412992 (2021); see also arXiv:2105..
- M. Iskin, “Non-Hermitian BCS-BEC evolution with a complex scattering length”; Phys. Rev. A 103, 013724 (2021); see also arXiv:2002.00653.
- M. Iskin, “Collective excitations of a BCS superfluid in the presence of two sublattices”; Phys. Rev. A 101, 053631 (2020); see also arXiv:2001.00198.
- M. Iskin, “Bardeen-Cooper-Schrieffer–type pairing in a spin-(1/2) Bose gas with spin-orbit coupling”; Phys. Rev. A 101, 013604 (2020); see also arXiv:2001.02584.
- M. Iskin, “Geometric contribution to the Goldstone mode in spin-orbit-coupled Fermi superfluids”; Physica B 592, 412260 (2020); see also arXiv:1908.00818.
- M. Iskin, “Origin of flat-band superfluidity on the Mielke checkerboard lattice”; Phys. Rev. A 99, 053608 (2019); see also arXiv:1902.10897.
- M. Iskin, “Superfluid stiffness for the attractive Hubbard model on a honeycomb optical lattice”; Phys. Rev. A 99, 023608 (2019); see also arXiv:1901.05612.
- M. Iskin, “Geometric mass acquisition via a quantum metric: An effective-band-mass theorem for the helicity bands”; Phys. Rev. A 99, 053603 (2019); see also arXiv:1803.04176.
- M. Iskin, “Spin susceptibility of spin-orbit-coupled Fermi superfluids”; Phys. Rev. A 97, 053613 (2018); see also arXiv:1802.03157.
- M. Iskin, “Quantum metric contribution to the pair mass in spin-orbit-coupled Fermi superfluids”; Phys. Rev. A 97, 033625 (2018); see also arXiv:1801.09388.
- M. Iskin, “The Tale of the Tail that Wags the Dog: Breaking Equality via Symmetry and Topology”; Koç University Frontier Magazine (2018), and its Turkish version “Köpeği Sallayan Kuyruk Öyküsü: Simetri ve Topolojiyle Eşitliği Bozmak”; Fener Magazine (2018).
- M. Iskin, “Exposing the quantum geometry of spin-orbit-coupled Fermi superfluids”; Phys. Rev. A 97, 063625 (2018); see also arXiv:1711.07262.
- M. Iskin, “Berezinskii-Kosterlitz-Thouless transition in the time-reversal-symmetric Hofstadter-Hubbard model”; Phys. Rev. A 97, 013618 (2018); see also arXiv:1710.07495.
- M. Iskin, “Hofstadter-Hubbard model with opposite magnetic fields: Bardeen-Cooper-Schrieffer pairing and superfluidity in the nearly flat butterfly bands”; Phys. Rev. A 96, 043628 (2017); see also arXiv:1709.00767.
- R. O. Umucalılar and M. Iskin, “BCS theory of time-reversal-symmetric Hofstadter-Hubbard model”; Phys. Rev. Lett. 119, 085301 (2017); see also arXiv:1704.07755.
- E. Doko, A. L. Subaşı, and M. Iskin, “Interplay between Rashba spin-orbit coupling and adiabatic rotation in a two-dimensional Fermi gas”; Phys. Rev. A 95, 013601 (2017); see also arXiv:1608.07110.
- M. Iskin, “Trapped Yb-173 Fermi gas across an orbital Feshbach resonance”; Phys. Rev. A 95, 013618 (2017); see also arXiv:1608.02773.
- R. O. Umucalılar and M. Iskin, “Superfluid transition in the attractive Hofstadter-Hubbard model”; Phys. Rev. A 94, 023611 (2016); see also arXiv:1605.07426.
- M. Iskin, “Two-band superfluidity and intrinsic Josephson effect in alkaline-earth Fermi gases across an orbital Feshbach resonance”; Phys. Rev. A 94, 011604(R) (2016); see also arXiv:1605.00470.
- M. Iskin, “Topological phase transitions on a triangular optical lattice with non-Abelian gauge fields”; Phys. Rev. A 93, 033632 (2016); see also arXiv:1601.01185.
- E. Doko, A. L. Subaşı, and M. Iskin, “Rotating a Rashba-coupled Fermi gas in two dimensions”; Phys. Rev. A 93, 033640 (2016); see also arXiv:1510.02334.
- M. Iskin, “Topological superfluids on a square optical lattice with non-Abelian gauge fields: Effects of next-nearest-neighbor hopping in the BCS-BEC evolution”; Phys. Rev. A 93, 013608 (2016); see also arXiv:1509.08219.
- M. Iskin, “Time-of-flight images of Mott insulators in the Hofstadter-Bose-Hubbard model”; Phys. Rev. A 92, 023636 (2015); see also arXiv:1504.02399.
- M. Iskin, “Attractive Hofstadter-Hubbard model with imbalanced chemical and vector potentials”; Phys. Rev. A 91, 053606 (2015); see also arXiv:1501.01176.
- M. Iskin, “Stripe-ordered superfluid and supersolid phases in the attractive Hofstadter-Hubbard Model”; Phys. Rev. A 91, 011601(R) (2015); see also arXiv:1406.6890.
- A. T. Bolukbasi and M. Iskin, “Superfluid-Mott insulator transition in spin-orbit-coupled Bose-Hubbard Model”; Phys. Rev. A 89, 043603 (2014); see also arXiv:1401.0527.
- M. Iskin, “Superfluid phases of ultracold Fermi gases on a checkerboard superlattice”; Phys. Rev. A 88, 053606 (2013); see also arXiv:1304.8111.
- M. Iskin, “Spin-orbit coupling induced Fulde-Ferrell-Larkin-Ovchinnikov-like Cooper pairing and skyrmion-like polarization textures in optical lattices”; Phys. Rev. A 88, 013631 (2013); see also arXiv:1304.1473.
- M. Iskin and A. L. Subaşı, “Topological superfluid phases of an atomic Fermi gas with in- and out-of-plane Zeeman fields and equal Rashba-Dresselhaus spin-orbit coupling”; Phys. Rev. A 87, 063627 (2013); see also arXiv:1211.4020.
- M. Iskin, “Mastering the Ultracold”; Koç University Frontier Magazine (2012), and its Turkish version “Aşırı soğuğa hakim olmak ama neden?”; Fener Magazine (2012) (translated mostly by E. D.).
- M. Iskin, “Trapped Fermi gases with Rashba spin-orbit coupling in two dimensions”; Phys. Rev. A 86, 065601 (2012); see also arXiv:1206.1240.
- E. Doko, A. L. Subaşı, and M. Iskin, “Counterflow of spontaneous mass currents in trapped spin-orbit-coupled Fermi gases”; Phys. Rev. A 85, 053634 (2012); see also arXiv:1112.4468.
- M. Iskin, “Vortex line in spin-orbit coupled atomic Fermi gases”; Phys. Rev. A 85, 013622 (2012); see also Erratum, and arXiv:1111.6450.
- M. Iskin and A. L. Subaşı, “Quantum phases of atomic Fermi gases with anisotropic spin-orbit coupling”; Phys. Rev. A 84, 043621 (2011); see also arXiv:1108.4263.
- M. Iskin and A. L. Subaşı, “Mass-imbalanced Fermi gases with spin-orbit coupling”; Phys. Rev. A 84, 041610(R) (2011); see also arXiv:1107.2376.
- M. Iskin and A. L. Subaşı, “Stability of spin-orbit coupled Fermi gases with population imbalance”; Phys. Rev. Lett. 107, 050402 (2011); see also arXiv:1106.0473.
- M. Iskin, “Route to supersolidity for the extended Bose-Hubbard model”; Phys. Rev. A 83, 051606(R) (2011); see also arXiv:1101.6067.
- M. Iskin, “Artifical gauge fields for the Bose-Hubbard model on a checkerboard superlattice and extended Bose-Hubbard model”; Eur. Phys. J. B 85, 76 (2012); see also arXiv:1101.0504.
- M. Iskin, “Mean-field theory for the Mott insulator-paired superfluid transition in the two-species Bose-Hubbard model”; Phys. Rev. A 82, 055601 (2010); see also arXiv:1010.2688.
- M. Iskin, “Isothermal-sweep theorems for ultracold quantum gases in a canonical ensemble”; Phys. Rev. A 83, 033613 (2011); see also arXiv:1009.2648.
- M. Iskin and A. L. Subaşı, “Cooper pairing and BCS-BEC evolution in mixed-dimensional Fermi gases”; Phys. Rev. A 82, 063628 (2010); see also arXiv:1004.3111.
- M. Iskin and C. A. R. Sa de Melo, “Ultracold fermions in real or fictitious magnetic fields: BCS-BEC evolution and type-I–type-II transition”; Phys. Rev. A 83, 045602 (2011); see also arXiv:1003.2405.
- M. Iskin, “Dimer-atom scattering between two identical fermions and a third particle”; Phys. Rev. A 81, 043634 (2010); see also arXiv:1003.0106.
- M. Iskin, “Strong-coupling expansion for the two-species Bose-Hubbard model”; Phys. Rev. A 82, 033630 (2010); see also arXiv:1001.0021.
- Itay Hen, M. Iskin, and M. Rigol, “Phase diagram of the hardcore Bose-Hubbard model on a checkerboard superlattice”; Phys. Rev. B 81, 064503 (2010); see also arXiv:0911.0890.
- M. Iskin and J. K. Freericks, “Dynamical mean-field theory for light-fermion–heavy-boson mixtures on optical lattices”; Phys. Rev. A 80, 053623 (2009); see also arXiv:0908.4589.
- M. Iskin and J. K. Freericks, “Momentum distribution of the insulating phases of the extended Bose-Hubbard model”; Phys. Rev. A 80, 063610 (2009); see also arXiv:0905.1027.
- M. Iskin and J. K. Freericks, “Strong-coupling perturbation theory for the extended Bose-Hubbard model”; Phys. Rev. A 79, 053634 (2009); see also arXiv:0903.0845.
- M. Iskin and E. Tiesinga, “Rotation-induced superfluid-normal phase separation in trapped Fermi gases”; Phys. Rev. A 79, 053621 (2009); see also arXiv:0811.3010.
- M. Iskin and C. J. Williams, “Trapped fermion mixtures with unequal masses: a Bogoliubov-de Gennes approach”; arXiv:0810.5065. [unpublished]
- M. Iskin, “Vortex core states in superfluid Fermi-Fermi mixtures with unequal masses”; Phys. Rev. A 78, 021604(R) (2008); see also arXiv:0804.1035.
- M. Iskin and C. A. R. Sa de Melo, “Evolution from BCS to Berezinzkii-Kosterlitz-Thouless superfluidity in one-dimensional optical lattices”; Phys. Rev. Lett. 103, 165301 (2009); see also arXiv:0803.1498.
- M. Iskin and C. J. Williams, “Population imbalanced fermions in harmonically trapped optical lattices”; Phys. Rev. A 78, 011603(R) (2008); see also arXiv:0802.3945.
- M. Iskin and C. J. Williams, “Trapped p-wave superfluids: a local density approach”; Phys. Rev. A 77, 041607(R) (2008); see also arXiv:0801.3795.
- M. Iskin and C. A. R. Sa de Melo, “Quantum phases of Fermi-Fermi mixtures in optical lattices”; Phys. Rev. A 78, 013607 (2008); see also arXiv:0712.3472.
- M. Iskin and C. J. Williams, “Trap-imbalanced fermion mixtures”; Phys. Rev. A 77, 013605 (2008); see also arXiv:0710.0353.
- M. Iskin and C. A. R. Sa de Melo, “Fermi-Fermi mixtures in the strong attraction limit”; Phys. Rev. A 77, 013625 (2008); see also arXiv:0709.4424.
- M. Iskin, “BCS to BEC evolution and quantum phase transitions in superfluid Fermi gases”; Georgia Tech (2007); Ph.D. Thesis. [186 pages, 48 figures, 1 table]
- M. Iskin and C. A. R. Sa de Melo, “Mixtures of ultracold fermions with unequal masses”; Phys. Rev. A 76, 013601 (2007); see also cond-mat/0703258.
- M. Iskin and C. A. R. Sa de Melo, “Superfluid and insulating phases of fermion mixtures in optical lattices”; Phys. Rev. Lett. 99, 080403 (2007); see also cond-mat/0612496.
- M. Iskin and C. A. R. Sa de Melo, “Ultracold heteronuclear molecules and ferroelectric superfluids”; Phys. Rev. Lett. 99, 110402 (2007); see also cond-mat/0610380.
- M. Iskin and C. A. R. Sa de Melo, “Evolution of two-band superfluidity from weak to strong coupling”; J. Low Temp. Phys. 149, 29 (2007).
- M. Iskin and C. A. R. Sa de Melo, “Asymmetric two-component Fermi gas with unequal masses”; cond-mat/0606624. [unpublished]
- M. Iskin and C. A. R. Sa de Melo, “Two-species fermion mixtures with population imbalance”; Phys. Rev. Lett. 97, 100404 (2006); see also cond-mat/0604184.
- M. Iskin and C. A. R. Sa de Melo, “Two-band superfluidity from the BCS to the BEC limit”; Phys. Rev. B 74, 144517 (2006); see also cond-mat/0603601.
- M. Iskin and C. A. R. Sa de Melo, “Nonzero orbital angular momentum pairing in superfluid Fermi gases”; Phys. Rev. A 74, 013608 (2006); see also cond-mat/0602157.
- M. Iskin and C. A. R. Sa de Melo, “Evolution from BCS to BEC superfluidity in p-wave Fermi gases”, Phys. Rev. Lett. 96, 040402 (2006); see also cond-mat/0510300.
- M. Iskin and C. A. R. Sa de Melo, “Superfluidity of p-wave and s-wave atomic Fermi gases in optical lattices”; Phys. Rev. B 72, 224513 (2005); see also cond-mat/0508134.
- M. Iskin and C. A. R. Sa de Melo, “Exotic p-wave superfluidity of single hyperfine state Fermi gases in optical lattices”; cond-mat/0502148. [unpublished]
- M. Iskin and C. A. R. Sa de Melo, “BCS-BEC crossover of collective excitations in two-band superfluids”, Phys. Rev. B 72, 024512 (2005); see also cond-mat/0408586.
- M. Iskin and I. O. Kulik, “Persistent currents in helical structures”, Phys. Rev. B 70 195411 (2004); see also cond-mat/0403677.