First, we study the QPT for t = 0. In this case, the system is a bipartite system without frustration and has the particle–hole symmetry at ϵ = −U/2 − 2V. Because the Fermi level is chosen as ϵ_kF = 0 in the NRG calculation, the TQD system is half filled and the electron occupation in each dot is always n_i = 1 at ϵ = −U/2 − 2V.

For small V, each dot tends to be singly occupied due to the strong on-site Coulomb repulsion U. There are antiferromagnetic interactions between dot 3, dot 1, and dot 2 due to the interdot hopping t₀ and the on-site Coulomb repulsion U. Therefore, the TQD forms a local doublet with a local spin S_dot = 1/2. At low temperature, this local spin is totally screened by the conduction electrons in the leads, and the Kondo effect is observed. Figure 3 shows the transmission T(ω) at zero temperature for different V values. For small V in Fig. 3(a), one can see a Kondo resonance peak, corresponding to the full conductance G = 2e²/h, and a Coulomb peak at about ω = ±U/2.

Fig. 3.

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	Fig. 3. (color online) Transmission coefficient T(ω) at zero temperature for different V and U values. Here, Γ = 0.01, t0 = 0.01, t = 0, and ϵ = −U/2 − 2V.

The interdot Coulomb repulsion V is favorable for the dots doubly occupied and it can destroy the Kondo resonance. As V increases, the width of the Kondo peak becomes narrow (e.g., V = 0.062 in Fig. 3(a)). This indicates that the Kondo effect occurs at lower temperature. When V is larger than a critical V_c1 = 0.0888 (e.g., V = 0.12 in Fig. 3(b)), the Kondo peak disappears and the Coulomb peak is located at about ω = ±(V −U/2). This behavior indicates that at V = V_c1, there is a transition from the Kondo resonance state to the Coulomb blockade state. To explore the characteristic of the QPT, we present the transmission T(ω) in Fig. 4(a) in the regime V < V_c1 and close to the critical point V_c1. We find that the width of Kondo peak W depends exponentially on the distance to the critical point (V − V_c1) and can be adequately described using an exponential function W = C exp[−A/(V − V_c2)^ν], where the fitting parameters C = 1.0002, A = 1.9513, and ν = 0.4370. Figure 4(b) indicates that the fitting function (solid line) agrees very well with the NRG results (scattering dots). This exponentially-dependent width W indicates that the KR–CB transition at V_c1 is a QPT of the KT type.^[33]

Fig. 4.

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Fig. 4. (color online) (a) Transmission T(ω) in the KR state near the critical point V = Vc1; the curves from top to bottom are for V = 0.062 to 0.082 in steps of 0.002. (b) The width of the Kondo peak W (scattering dots) and its stimulant exponential function (solid line) as a function of V near Vc1. (c) Double occupation on the transformed orbital fiσ as a function of V. (d) Total magnetic moment μ2(T) as a function of the temperature T for different V values. Here, U = 0.1 and the remaining parameters are the same as in Fig. 3.

As V increases to the second critical point V_c2 = 0.154 (e.g., V = 0.17 in Fig. 3(c)), we also observe a transmission T(ω = 0) with a unitary limit. We call this ground state as the V-induced resonance state. The shape of the transmission spectra does not depend on V in the VIR state. For instance, the curves for different V and the same U coincide with each other; although with U increasing, the peak becomes narrow. This feature is quite different from the above KR in Fig. 3(b). In order to explain this behavior of the transmission, we introduce the combinations of the dot orbitals; i.e., , , and f_3σ = d_3σ. Under this transformation, the interaction terms in the dot Hamiltonian in Eq. (4) can be expressed as 4 where and . In this case, the leads are just connected to the orbital f_1σ with even parity. According to Eq. (3), the transmission T(ω) is merely determined by the density of state of orbital f_1σ.

We show the double occupation in Fig. 4(c). As V increases, the double occupation on dot 1 increases from about 0.12 at V = 0 to about 0.30 at V = 0.15. It is known that the double occupation for a half-filled noninteraction orbital is 1/4. The Kondo effect requires the dot to be almost singly occupied. As a result, the Kondo resonance can not be observed for large V. Meanwhile, according to Eqs. (4) and (1), one can deduce that for large V, adding an additional electron to the system will cost energy V − U/2. Therefore, the CB peaks appear at ω = ±(V − U/2) as shown in Fig. 3(b). The continuous change of at the critical V = V_c1 indicates that the transition from the KR state to the CB state is continuous.

As V > V_c2, there is an abrupt change of the double occupation (see Fig. 4(c)). In particular, the double occupation on the orbital f_2σ increases from 0 to 0.5, which indicates that the orbital f_2σ is doubly occupied or empty. Meanwhile, the double occupation on the orbital f_1σ decreases to , which is smaller than 0.25 of the double occupation on a half-filled non-interaction orbital. According to Eq. (3), after the transformation of dot orbitals, the transmission T(ω) is determined by the single occupation on orbital f_1σ. The increase of the single occupation on the orbital f_1σ induces a transmission T(ω) with a unitary limit in the VIR state.

Figure 4(d) shows the temperature dependence of the total magnetic moment defined by , where and denote the thermodynamic expectation values of the square of the z component of the total spin of the system with and without quantum dots, respectively.^[30,31] For small V (e.g., V = 0.01), at a high temperature T ∼ 0.015, each dot has a free local spin 1/2 and contributes 1/4 to μ². Because there is some possibility of double occupy in this regime, μ² is about 0.5 which is smaller than the maximum 3/4. With T decreasing (e.g., ), the interdot antiferromagnetic interactions drive the triple dots to a doublet with μ² ≈ 1/4. At lower temperature T → 0, the local spin S_dot = 1/2 is totally screened by the conduction electron in the leads and a Kondo resonance is observed in Fig. 3(a). For V > V_c1 (e.g., V = 0.12), the double occupation on the transformed orbitals f_1σ and f_3σ is large (see Fig. 4(c)) while the orbital f_2σ is still singly occupied. As a result, no local spin on the orbital f_1σ can be screened by the conduction electron in the leads. We observe a residual magnetic moment μ² = 0.25 in the CB state, which is the local spin on the orbital f_2σ.

Although we observe the full conductance both in the KR state and the VIR state in Fig. 3, their origins are quite different. For small V in Fig. 3(a), the spin of the electron on a singly occupied orbital f_1σ is screened by the conduction electron in the leads. Therefore, adding an additional electron with opposite spin to this orbital does not require overcoming the on-site Coulomb repulsion U. This is the so called Kondo effect. However, for large V in Fig. 3(c), the full conductance does not mainly result from the screening effect of the spin on the dot. For instance, even for on-site repulsion U = 0 we still observe a perfect transmission T(ω = 0) = 1 in Fig. 3(c). From Eqs. (1) and (4), one finds that adding an electron to the singly occupied dot orbital f_1σ requires energy ϵ + 2V = 0 equal to the Fermi energy and, therefore, the electron can transmit the dot freely. For U = 0, transmission spectra T(ω) are given by a Lorentzian with a width 2Γ. With U increasing (e.g., U = 0.05 and 0.1 in Fig. 3(c)), T(ω) becomes narrow rapidly. This feature can be explained by the following picture. As U increases, there is a small antiferromagnetic interaction between the dots and the leads. This antiferromagnetic interaction induces a small magnetic moment μ² of about 0.13 at temperature T ∼ 0.002 (e.g., for U = 0.1 and V = 0.17 in Fig. 4(d)). At lower temperature T → 0, this magnetic moment is screened by the conduction electron in the leads. According to Haldane’s expression,^[30,31] the screening temperature T_K decreases exponentially as U/Γ increases, corresponding to the width of the transmission spectrum. The calculation shows that as U increases, the transmission spectrum changes from the Lorentzian to the sharp peak smoothly. This feature indicates that in the VIR ground state, although the on-site repulsion U affects the shape of the transmission spectrum, the origin of the full conductance is the same as that for U = 0 and V > 0. As U increases to a critical U_c > V, the system transits to the CB state in Fig. 3(b). From Fig. 3(c), we also find that the shape of the transmission spectra does not depend on V in the VIR state. For instance, the curves for different V and the same U coincide with each other. This feature is quite different from the Kondo resonance induced by the on-site repulsion U.

Next, we consider the TQD system with frustration t. For nonzero interdot hopping t, the particle–hole symmetry is broken due to the frustration. The electron occupation in each dot n_i = 1 is not kept at ϵ = −U/2 − 2V. From the phase diagram in Fig. 2, we can see that for small V and large V, the phase sequences are quite different.

For small V (e.g., V = 0.05), Figs. 5(a) and 5(b) show the transmission T(ω) at zero temperature for different t. For small frustration t (e.g., t = 0.0114 in Fig. 5(a)), the Coulomb peaks at ω ≈ ±U/2 and the Kondo resonance peak at ω = 0 are still observed. The ground state is the KR state. As t is greater than the critical t_c = 0.01147 (e.g., t = 0.0115 in Fig. 5(b)), the Kondo peak disappears and the Coulomb peaks move to the direction ω < 0, which indicates an increase of the occupation on the orbital f_1σ. In order to understand this behavior, we give the energy levels of the even orbital f_1σ and the odd orbital f_2σ as ϵ₁ = ϵ −t and ϵ₂ = ϵ + t. Obviously, as t increases, ϵ₁ decreases while ϵ₂ increases. Figures 5(c) and 5(d) show the charge occupation and the double occupation on each orbital. It is found that the orbital f_1σ is almost doubly occupied for large t > t_c while f_3σ is singly occupied and f_2σ is nearly empty. In this case, the Hamiltonian in Eq. (1) maps to a single impurity Anderson model with impurity orbital f_1σ connected to the leads while the singly occupied f_3σ and the empty orbital f_2σ decouple from f_1σ. Because the impurity orbital f_1σ is doubly occupied, the electrons on f_1σ form an orbital spin-singlet (OSS) without Kondo effect.

Fig. 5.

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	Fig. 5. (color online) (a) and (b) Transmission T(ω) for different t values. (c) Charge occupation and (d) double occupation on orbital f1σ as a function of t. Here, Γ = 0.01, t0 = 0.01, U = 0.1, V = 0.05, and ϵ = −U/2 − 2V.

For large V (e.g., V = 0.12), the transmission T(ω) in Fig. 6 exhibits two kinds of phase transitions. For small t, the system is in the CB state (Fig. 6(a)) although the two Coulomb peaks are not symmetric about ω = 0 due to the frustration. As t is greater than a critical value t_c1 = 0.00683 (e.g., t = 0.0069 in Fig. 6(b)), the system transits to the VIR state with a sharp central peak and a full conductance. With further increase of t, the peak becomes narrow and disappears at t = t_c2 = 0.0457 (e.g., t = 0.05 in Fig. 6(c)). This feature indicates that there is phase transition from the VIR state to the OSS state. Figure 7(a) shows the critical behavior of the transmission on the VIR state near the critical point t_c2. The width of the peak W becomes narrow exponentially as t approaches to t_c2. It can be adequately described using an exponential function W = C exp[−A/(V − V_c2)^ν], where the fitting parameters C = 1.0051, A = 1.6344, and ν = 0.470. Figure 7(b) indicates that the fitting function (solid line) agrees very well with the NRG results (scattering dots). This exponentially-dependent width W indicates that the VIR–OSS transition at t_c2 is of the KT type.^[32] Figures 7(c) and 7(d) present the charge occupation and the double occupation on each orbital for V = 0.12 and different t. The abrupt changes in and at the critical point t_c1 indicate a first order QPT from the CB to the VIR state. From Figs. 7(c) and 7(d), one can easily obtain that the single occupation on the orbital f_1σ increases from about 0.41 to about 0.58 at the critical point t_c1. This feature favors the full conductance in the VIR state as discussed in Section 3.1. In the VIR state and near the critical point t_c1, the orbital f_2σ is nearly empty while the orbital f_3σ is almost doubly occupied. This feature is somewhat different from that for t = 0. In the VIR state without frustration (e.g., t = 0 and V > V_c2 in Fig. 4(c)), the possibility of being doubly occupied on the orbital f_2σ is the same as that of being empty due to the particle–hole symmetry. However, the orbital f_2σ is nearly empty due to the frustration t in Fig. 7(c). The common feature for t = 0and t ≠ 0 is that the increase of the single occupation on the orbital f_1σ induces the full conductance in the VIR state. As t increases continuously in the regime t > t_c1, the charge occupation and the double occupation on the orbital f_1σ increases continuously. As t > t_c2, the system transits to the OSS state through a QPT of the KT type.

Fig. 6.

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	Fig. 6. Transmission coefficient T(ω) at zero temperature for different t values. Here, Γ = 0.01, t0 = 0.01, U = 0.1, V = 0.12, and ϵ = −U/2 − 2V.

Fig. 7.

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Fig. 7. (color online)(a) Transmission T(ω) in the VIR state near the critical point t = tc2; the curves from top to bottom are for t=0.030 to 0.042 in steps of 0.001. (b) The width of the Kondo peak W (scattering dots) and its stimulant exponential function (solid line) as a function of t near t = tc2. (c) Charge occupation and (d) double occupation on orbital fiσ as a function of t. The remaining parameters are the same as in Fig. 6.