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Buck-Sukumar (BS) 模型在一定的耦合强度处会出现能级塌缩现象. 通过引入一个非线性光子项, 定义了一个完备的 BS 模型, 消除了能级塌缩. 进一步通过计算二阶关联函数等物理量理解了非线性光子项与失谐量对该模型的影响. 结果表明, 在共振情况下, 非线性光子项破坏了BS模型的能谱简谐性, 可以在更大的耦合强度范围内产生单光子投影态, 形成光子阻塞; 而在非共振情况下, 非线性光子项使非简谐的能谱在整个耦合区间都有定义, 且正失谐促进光子阻塞, 负失谐抑制光子阻塞.
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关键词:
- Buck-Sukumar模型 /
- 二阶关联函数 /
- 光子阻塞
The Buck-Sukumar (BS) model, with a nonlinear coupling between the atom and the light field, is well defined only when its coupling strength is lower than a critical coupling. Its energy collapses at a critical coupling and is unbounded beyond that value. In other words, the BS model is incomplete. We introduce a simple and complete BS model by adding a nonlinear photon term into the initial BS model. Considering the rotating wave approximation, this complete BS model conserves the excited number and the parity. By expanding it in the subspace of the product state between the atom and the field, we solve the time-independent Schrödinger equation to obtain the eigenenergy and eigenstate. Furthermore, we explore the influence of the nonlinear photon term on the energy spectrum and the photon blockade effect for the complete BS model by calculating the excited number and second-order correlation function. Our study shows that, the nonlinear photon term not only eliminates the energy spectral collapse but also makes it well-defined and complete in all the coupling regime. When at the resonance between the atomic and the field frequency, the nonlinear photon term breaks the harmonicity of the energy spectrum and produces a ladder of the excited number in the ground state. Because the larger nonlinear photon term inhibits the photon transition from an energy level to the higher one, it produces the single-photon projection state in the larger coupling region. Accordingly, we find that the nonlinear photon term promotes photon blockade by calculating the second-order correlation function. When at the non-resonant region, the nonlinear photon term enlarges the originally anharmonic energy ladder. For a complete BS model with the fixed nonlinear photon coupling strength and the fixed detuning, the energy level for the positive detuning is lower than that with the negative detuning, and more energy is required to overcome the absorption of a photon. Therefore, the positive detuning promotes the photon blockade. For the negative detuning, the system is more likely to absorb a photon and jump to a higher energy level, and therefore, suppresses the photon blockade. [1] Jaynes E T, Cummings F W 1963 Proc. IEEE 51 89Google Scholar
[2] Thompson R J, Rempe G, Kimble H J 1992 Phys. Rev. Lett. 68 1132Google Scholar
[3] Brune M, Schmidt-Kaler F, Maali A, Dreyer J, Hagley E, Raimond J M, Haroche S 1996 Phys. Rev. Lett. 76 1800Google Scholar
[4] Leibfried D, Blatt R, Monroe C, Wineland D 2003 Rev. Mod. Phys. 75 281Google Scholar
[5] Englund D, Faraon A, Fushman I, Stoltz N, Petroff P, Vučković J 2007 Nat. Lett. 450 857Google Scholar
[6] Frisk-Kokum A, Miranowicz A, De Liberato S, Savasta S, Nori F 2019 Nat. Rev. Phys. 1 19Google Scholar
[7] Rossatto D Z, Villas-Bǒas C J, Sanz M, Solano E 2017 Phys. Rev. A 96 013849Google Scholar
[8] Braak D 2011 Phys. Rev. Lett. 107 100401Google Scholar
[9] Chen Q, Wang C, He S, Wang K 2012 Phys. Rev. A 86 023822Google Scholar
[10] Buck B, Sukumar C V 1981 Phys. Lett. A 81 132
[11] Ng K M, Lo C F, Liu K L 2000 Phys. A: Stat. Mech. Appl. 275 463Google Scholar
[12] Rodríguez-Lara B M, Soto-Eguibar F, Cárdenas A Z, Moya-Cessa H M 2013 Opt. Express 21 12888Google Scholar
[13] Rodríguez-Lara B M 2014 J. Opt. Soc. Am. B 31 1719Google Scholar
[14] Penna V, Raffa F A 2014 Int. J. Quantum Inf. 12 1560010Google Scholar
[15] Cordeiro F, Providência C, da Providência J, Nishiyama S 2007 J. Phys. A: Math. Theor. 40 12153Google Scholar
[16] Liu X Y, Ren X Z, Wang C, Gao X L, Wang K L 2020 Commun. Theor. Phys. 72 065502Google Scholar
[17] Felicetti S, Rossatto D Z, Rico E, Solano E, Forn-Díaz P 2018 Phys. Rev. A. 97 013851Google Scholar
[18] Duan L, Xie Y F, Braak D, Chen Q H 2016 J. Phys. A: Math. Theor. 49 464002Google Scholar
[19] Lo C F 2020 Sci. Rep. 10 18761Google Scholar
[20] Cui S, Grémaud B, Guo W, Batrouni G G 2020 Phys. Rev. A 102 033334Google Scholar
[21] Moya-Cessa H, Soto-Eguibar F, Vargas-Martínez J M, Juárez- Amaro R, Zúñiga-Segundo A 2012 Phys. Rep. 513 229Google Scholar
[22] Valverde C, Gonçalves V G, Baseia B 2016 Phys. A: Stat. Mech. Appl. 446 171Google Scholar
[23] Pritchard J D 2012 Ph. D. Dissertation (Durham: Durham University)
[24] Grünwald P 2019 New J. Phys. 21 093003Google Scholar
[25] Li M C, Chen A X 2019 Atom. Appl. Sci. 9 980Google Scholar
[26] Birnbaum K M, Boca A, Miller R, Boozer A D, Northup T E, Kimble H J 2005 Nature 436 87Google Scholar
[27] Michler P, Kiraz A, Becher C, Schoenfeld W V, Petroff P M, Zhang L, Hu E, Imamoǧlu A 2005 Science 290 2282Google Scholar
[28] Greentree A D, Tahan C, Cole J H, Hollenberg L C 2006 Nat. Phys. 2 856Google Scholar
[29] Koch J, Hur K L 2009 Phys. Rev. A. 80 023811Google Scholar
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图 1 共振时
$\varDelta=0$ , 非线性光子耦合项对旋波近似下的 BS 模型能谱的影响, 其中 (a)$ U=0 $ , (b)$ U=0.1 $ , 红色代表偶宇称态, 蓝色代表奇宇称态, 实线代表$ E_{n}^{\left(+\right)} $ 支, 虚线代表$ E_{n}^{\left(-\right)} $ 支Fig. 1. Influence of the nonlinear photon term on the BS model with the rotating wave approximation at resonance
$\varDelta=0$ , where (a)$ U=0 $ , (b)$ U=0.1 $ , the red (blue) line represents the energy level with even (odd) parity while the solid (dashed) line represents the energy level of$ E_{n}^{\left(+\right)} $ ($ E_{n}^{\left(-\right)} $ ).图 3 共振时
$ \varDelta=0 $ , 非线性光子项对旋波近似下的BS模型能级差$ \text{δ} E_{m}, \; m=d, \; 0, \; 1, \; \cdots $ 的影响 (a)$ U=0 $ ; (b)$ U \ne 0 $ , 图中红色线表示$ U=1 $ , 黑色线表示$ U=0.5 $ Fig. 3. For the BS model with the rotating wave approximation at resonance
$ \varDelta=0 $ , the influence of the nonlinear photon term on the nearest neighbor energy level difference$\text{δ} E_{m}, \; m=d, \; 0,\; 1, \; \cdots $ , where (a)$ U=0 $ , (b)$ U \ne 0 $ and the red (black) line represents$ U=1(0.5) $ in panel (b)图 4 共振时
$ \varDelta=0 $ , 非线性光子项对旋波近似下 BS 模型的基态二阶关联函数$ G_{2}\left(0\right) $ 的影响 (a)$ G_{2}\left(0\right) $ 随非线性光子 U和耦合强度$ g_{{\rm{r}}} $ 的变化, 颜色代表对$ G_{2}\left(0\right) $ 取对数后$ \log\left(G_{2}\left(0\right)\right) $ 的值; (b) 不同非线性光子耦合强度U下$ G_{2}\left(0\right) $ 随耦合强度$ g_{{\rm{r}}} $ 的变化Fig. 4. For the BS model with the rotating wave approximation at resonance
$ \varDelta=0 $ , the influence of the nonlinear photon term on the second-order correlation function$ G_{2}\left(0\right) $ : (a) Variation of$ G_{2}\left(0\right) $ as a function of the nonlinear photon term U and the coupling strength$ g_{{\rm{r}}} $ , where the color represents the value of$ \log\left(G_{2}\left(0\right)\right) $ ; (b) variation of$ G_{2}\left(0\right) $ as a function of the coupling strength$ g_{{\rm{r}}} $ for different nonlinear photon terms U图 5 非线性光子项为
$ U=0.1 $ 时, 失谐量$ \varDelta \ne 0 $ 对旋波近似下BS模型的(a) 基态激发数$ \hat{N}_{{\rm{e}}} $ , (b) 能级差$\text{δ} E_{m}, $ $ \; m=d, \;0,\; 1$ , (c) 基态二阶关联函数$ G_{2}\left(0\right) $ 的影响. 图(b)中红色线代表$ \varDelta=-2 $ , 黑色线代表$ \varDelta=0 $ , 蓝色线代表$ \varDelta=2 $ Fig. 5. For the BS model with the rotating wave approximation with the nonlinear photon term
$ U=0.1 $ , influence of the detuning$ \varDelta\ne0 $ on the (a) excited number$ \hat{N}_{{\rm{e}}} $ in the ground state, (b) nearest neighbor energy level difference$ \text{δ} E_{m},\; m=d, \;0, \;1 $ , and (c) second-order correlation function$ G_{2}\left(0\right) $ in the ground state. The red, black and blue line represent$ \varDelta=-2 $ ,$ \varDelta=0 $ and$ \varDelta=2 $ respectively in panel (b) -
[1] Jaynes E T, Cummings F W 1963 Proc. IEEE 51 89Google Scholar
[2] Thompson R J, Rempe G, Kimble H J 1992 Phys. Rev. Lett. 68 1132Google Scholar
[3] Brune M, Schmidt-Kaler F, Maali A, Dreyer J, Hagley E, Raimond J M, Haroche S 1996 Phys. Rev. Lett. 76 1800Google Scholar
[4] Leibfried D, Blatt R, Monroe C, Wineland D 2003 Rev. Mod. Phys. 75 281Google Scholar
[5] Englund D, Faraon A, Fushman I, Stoltz N, Petroff P, Vučković J 2007 Nat. Lett. 450 857Google Scholar
[6] Frisk-Kokum A, Miranowicz A, De Liberato S, Savasta S, Nori F 2019 Nat. Rev. Phys. 1 19Google Scholar
[7] Rossatto D Z, Villas-Bǒas C J, Sanz M, Solano E 2017 Phys. Rev. A 96 013849Google Scholar
[8] Braak D 2011 Phys. Rev. Lett. 107 100401Google Scholar
[9] Chen Q, Wang C, He S, Wang K 2012 Phys. Rev. A 86 023822Google Scholar
[10] Buck B, Sukumar C V 1981 Phys. Lett. A 81 132
[11] Ng K M, Lo C F, Liu K L 2000 Phys. A: Stat. Mech. Appl. 275 463Google Scholar
[12] Rodríguez-Lara B M, Soto-Eguibar F, Cárdenas A Z, Moya-Cessa H M 2013 Opt. Express 21 12888Google Scholar
[13] Rodríguez-Lara B M 2014 J. Opt. Soc. Am. B 31 1719Google Scholar
[14] Penna V, Raffa F A 2014 Int. J. Quantum Inf. 12 1560010Google Scholar
[15] Cordeiro F, Providência C, da Providência J, Nishiyama S 2007 J. Phys. A: Math. Theor. 40 12153Google Scholar
[16] Liu X Y, Ren X Z, Wang C, Gao X L, Wang K L 2020 Commun. Theor. Phys. 72 065502Google Scholar
[17] Felicetti S, Rossatto D Z, Rico E, Solano E, Forn-Díaz P 2018 Phys. Rev. A. 97 013851Google Scholar
[18] Duan L, Xie Y F, Braak D, Chen Q H 2016 J. Phys. A: Math. Theor. 49 464002Google Scholar
[19] Lo C F 2020 Sci. Rep. 10 18761Google Scholar
[20] Cui S, Grémaud B, Guo W, Batrouni G G 2020 Phys. Rev. A 102 033334Google Scholar
[21] Moya-Cessa H, Soto-Eguibar F, Vargas-Martínez J M, Juárez- Amaro R, Zúñiga-Segundo A 2012 Phys. Rep. 513 229Google Scholar
[22] Valverde C, Gonçalves V G, Baseia B 2016 Phys. A: Stat. Mech. Appl. 446 171Google Scholar
[23] Pritchard J D 2012 Ph. D. Dissertation (Durham: Durham University)
[24] Grünwald P 2019 New J. Phys. 21 093003Google Scholar
[25] Li M C, Chen A X 2019 Atom. Appl. Sci. 9 980Google Scholar
[26] Birnbaum K M, Boca A, Miller R, Boozer A D, Northup T E, Kimble H J 2005 Nature 436 87Google Scholar
[27] Michler P, Kiraz A, Becher C, Schoenfeld W V, Petroff P M, Zhang L, Hu E, Imamoǧlu A 2005 Science 290 2282Google Scholar
[28] Greentree A D, Tahan C, Cole J H, Hollenberg L C 2006 Nat. Phys. 2 856Google Scholar
[29] Koch J, Hur K L 2009 Phys. Rev. A. 80 023811Google Scholar
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