Affleck-Dine leptogenesis with triplet Higgs

We study an extension of the supersymmetric standard model including a pair of electroweak triplet Higgs $\Delta$ and ${\bar \Delta}$. The neutrinos acquire Majorana masses mediated by these triplet Higgs fields rather than the right-handed neutrinos. The successful leptogenesis for baryogenesis can be realized after the inflation through the Affleck-Dine mechanism on a flat manifold consisting of $\Delta$, ${\bar \Delta}$, ${\tilde e}^c$ (anti-slepton), even if the triplet Higgs mass $M_\Delta$ is much larger than the gravitino mass $m_{3/2} \sim 10^3 {\rm GeV}$. Specifically, due to the effects of the potential terms provided with the superpotential terms $M_\Delta {\bar \Delta} \Delta$, $(\lambda_{L /} / 2M) {\bar \Delta} {\bar \Delta} e^c e^c$, $(\lambda_\Delta / 2M) {\bar \Delta} \Delta {\bar \Delta} \Delta$ ($\lambda_{L /} / \lambda_\Delta \sim 0.3 - 3$), the phases of $\Delta$, ${\bar \Delta}$, ${\tilde e}^c$ are rotated at the time with the Hubble parameter $H \sim M_\Delta$, producing generally the asymmetry with fraction $\epsilon_L \sim 0.1$. If $M_\Delta$ is large enough, this early leptogenesis can be completed before the thermal effects take place.


Introduction
The experiment of the atmospheric neutrinos by the SuperKamiokande collaboration indicated a convincing evidence for the neutrino masses and oscillations [1]. This hence will require some extension of the standard model by introducing lepton number nonconserving interactions. The natural explanation of the small Majorana neutrino masses is usually made by the see-saw mechanism with heavy right-handed electroweak singlet neutrinos [2]. It is also noted that the effective higher dimensional operator LLH u H u providing the small neutrino masses is generated even through the exchange of heavy electroweak triplet Higgs fields (L and H u are the lepton and Higgs doublets, respectively) [3].
The lepton number violating interactions, which may be provided with the right-handed neutrinos or the triplet Higgs as mentioned above for the neutrino masses, will even have important effects in the early universe. In particular, they can be relevant for the generation of lepton number asymmetry, i.e., leptogenesis. Then, the lepton number asymmetry can further produce the sufficient baryon number asymmetry through the anomalous sphaleron processes in the electroweak gauge theory [4]. Therefore, the leptogenesis in the early universe is a very interesting issue in the extensions of the standard model involving the lepton number violating interactions.
There are two familiar types of scenarios for leptogenesis. One is due to the nonequilibrium decays of heavy particles, and the other is the Affleck-Dine mechanism [5,6]. Both scenarios have been explored extensively in the ordinary see-saw case, i.e., the decay of right-handed neutrinos which are produced either thermally or non-thermally [4,7,8], and the Affleck-Dine mechanism with theLH u flat direction [6,9,10,11]. In this Affleck-Dine leptogenesis scenario, the lepton number asymmetry and the neutrino masses are related directly. It is clarified recently that if the thermal effects [12] and gravitino problem [13,14] are taken into account, the mass of the lightest neutrino should be less than of the order of 10 −8 eV [11] to generate the sufficient lepton number asymmetry.
On the other hand, the leptogenesis in the triplet Higgs case has not been examined fully so far. Recently, the non-equilibrium decay of triplet Higgs has been considered in a supersymmetric model [15,16]. In this triplet Higgs decay scenario, it is required that the mass of triplet Higgs should be less than the reheating temperature T R after inflation, which is bounded to be lower than 10 8 GeV − 10 10 GeV to avoid the gravitino problem [13,14]. It is also shown that two pairs of triplet Higgs are needed to provide the CP violating phase for leptogenesis. Furthermore, the masses of triplet Higgs should be almost degenerate in order to produce the sufficient lepton number asymmetry. Hence, it seems that the successful leptogenesis is obtained in a rather restricted situation in this triplet Higgs decay scenario.
As an alternative possibility, we investigate in this article the Affleck-Dine leptogenesis in an extension of the minimal supersymmetric standard model including a pair of triplet Higgs fields ∆ and∆. The gauge singlet mass M ∆ of triplet Higgs may be much larger than the gravitino mass m 3/2 ∼ 10 3 GeV representing the low-energy soft supersymmetry breaking terms. There appear some new interesting features in this leptogenesis scenario. Specifically, the lepton number asymmetry is generated on a multi-dimensional flat manifold consisting of the triplet Higgs ∆,∆ and anti-sleptonẽ c . This flat manifold is spanned by the two directions, the one is represented by∆∆ (Q L = 0) and the other by∆∆ẽ cẽc (Q L = 0). These directions are comparably flat with the superpotential terms (λ L / /2M)∆∆e c e c and (λ ∆ /2M)∆∆∆∆ of the same order (though any specific relation need not be assumed between λ L / and λ ∆ ). It is the essential point that there are several potential terms depending differently on the phases of Affleck-Dine (AD) fields ∆,∆,ẽ c which are significant for the Hubble parameter H M ∆ ≫ m 3/2 . Then, as shown in detail in the text, due to the effects of such terms the phases of AD fields start to fluctuate soon after the inflation, and then they are rotated at the time with H ∼ M ∆ . The lepton number asymmetry is generated through this time variation of the phases of AD fields with the lepton number violation provided by the superpotential term∆∆e c e c . The fraction of the resultant lepton number asymmetry amounts to ǫ L ∼ 0.1 for the generic model parameter values with λ L / /λ ∆ ∼ 0.3 − 3, which is rather independent of M ∆ . Therefore, the lepton number asymmetry for the successful baryogenesis is indeed generated even for M ∆ ≫ m 3/2 in the present scenario, which can be sufficiently before the thermal effects take place.

Model
Our leptogenesis scenario is implemented in an extension of the minimal supersymmetric standard model by introducing a pair of triplet Higgs superfields with gauge anomaly cancellation. The triplet Higgs superfields are listed as follows with their quantum numbers of The generic R-parity preserving superpotential relevant for the leptons and Higgs is given by where the generation index is suppressed for simplicity. We also assume R-parity preserving non-renormalizable terms, where M represents some very large mass scale such as the grand unification or Planck scale. For convenience of later analysis on leptogenesis, the coupling constants λ L / and λ ∆ are taken to be real by making suitable phase transformations of the relevant fields, while the complex phase is explicitly factored out in the∆∆ term with M ∆ > 0. Other non-renormalizable terms may exist as well, though they are not relevant for the leptogenesis investigated here. The triplet Higgs fields are R-parity even, and their lepton numbers are assigned as Then, the triplet Higgs mass term M ∆ and the f 1 coupling are lepton number conserving, while the lepton number violation is provided by the f 2 and f 3 couplings and also the λ L / term in W non . It is noticed in Eq. (2) that the triplet Higgs ∆ couples to the two lepton doublets LL. Hence, if ∆ 0 develops a vev (vacuum expectation value), then the ordinary neutrinos acquire Majorana masses through this f 1 coupling. In fact, by checking the vanishing of F -terms we find that in the supersymmetric limit the following vev's are induced for the triplet Higgs fields through the electroweak gauge symmetry breaking: where The f 2 coupling combined with the µ term provides contributions ∼ f 2 µv 2 /M 2 ∆ to these vev's, and the soft supersymmetry breaking terms also provide contributions ∼ m 3/2 v 2 /M 2 ∆ . (We do not consider below these sub-leading contributions for simplicity.) It should here be noted that these vev's are induced by the couplings explicitly violating the lepton number conservation. Hence, the so-called triplet Majoron does not appear from the ∆ and∆ fields, which rather acquire masses ≃ M ∆ .
The mass matrix for the ordinary neutrinos is given by This neutrino mass matrix is expected to provide an eigenvalue ∼ 10 −2 eV and smaller ones, in particular, in order to resolve the atmospheric neutrino anomaly. Then, the following condition is required for the eigenvalues (f 1 ) i of f 1 , This condition may be realized for reasonable values of f 1 , f 3 ∼ 10 −2 , if the triplet Higgs fields are very heavy with M ∆ ∼ 10 11 GeV [3]. It should be noted that the triplet Higgs mass can be heavy as long as the condition M ∆ ≪ H inf (the Hubble parameter during the inflation) is satisfied for the Affleck-Dine leptogenesis with triplet Higgs. An alternative way to realize the condition (7) from the neutrino masses may be considered, which is valid even for M ∆ ∼ m 3/2 . That is, the lepton number violation may originate in the ultra high energy scale M such as the grand unification or Planck scale. Then, the effective lepton number violation will appear as non-renormalizable terms in the electroweak scale, being suppressed by this large scale M. Specifically, the f 2 and f 3 terms may be replaced by the following ones, Here the gauge singlet field S with mass ∼ m 3/2 is also assumed to be present in the electroweak scale. This singlet field S may develop a vev S ∼ m 3/2 ∼ 10 3 GeV. Then, the f 2 and f 3 couplings are induced effectively as Now, if M ∼ 10 16 GeV or larger, the condition (7) for the neutrino masses is satisfied for the reasonable values of f 1 and f ′ 3 even in the case of M ∆ ∼ m 3/2 ∼ 10 3 GeV. In any case, it is reasonably expected that the lepton number violating couplings f 2 and f 3 are much smaller than the lepton number conserving coupling f 1 . Then, the triplet Higgs ∆ (∆) decays predominantly to two anti-leptons (sleptons) through the f 1 coupling. Therefore, the triplet Higgs fields are considered to carry almost the definite lepton numbers as assigned in Eq. (4). This feature is relevant for the Affleck-Dine leptogenesis with triplet Higgs, since after the leptogenesis the lepton number should be conserved with sufficient accuracy.

Flat Directions
We assume that the triplet Higgs mass is negligible at the end of inflation, though it may be much larger than the gravitino mass, M ∆ ≫ m 3/2 . Then, the triplet Higgs fields are allowed to enter into certain flat directions until the Hubble parameter H decreases to M ∆ . (This situation is similar to the µ term in the case ofLH u flat direction.) The F -terms are actually given (except for the contributions of W non ) as The flat directions involving the triplet Higgs fields are specified by the D-flat condition and the other fields are all vanishing for the F -flat conditions up to the contributions of M ∆ . (We consider in the following the one generation ofẽ c for simplicity.) The corresponding gauge singlet combinations are∆∆ (Q L = 0) and∆∆ẽ cẽc (Q L = 2), as given in Eq. (3). It should here be noted that these directions may be comparably flat, if the relevant nonrenormalizable superpotential terms are of the same order, specifically λ L / /λ ∆ ∼ 0.3 − 3, as seen explicitly later in the numerical analysis. Then, in contrast to the original Affleck-Dine scenario, the evolution of the scalar fields takes place on the complex two-dimensional flat manifold spanned by these directions.

Affleck-Dine Leptogenesis
We now examine the lepton number asymmetry generated by the Affleck-Dine mechanism with triplet Higgs in the present model. The relevant flat manifold is specified in Eq. (12). The scalar potential for the AD fields ∆ + ,∆ − ,ẽ c is given by (∆ ≡ ∆ + and∆ ≡∆ − henceforth for simplicity of notation). The last term with U(1) Y gauge coupling g ′ is included to realize the D-flat condition (12) for the large enough |∆|, |∆|, |ẽ c |. The nonzero energy density in the early universe provides the soft supersymmetry breaking terms with the Hubble parameter H in addition to the low-energy ones with the gravitino mass m 3/2 [6]. In the following, the evolution of the AD fields is described in the respective epochs for evaluating the lepton number asymmetry. It will really be confirmed later by solving the equations of motion numerically with the initial values specified by the potential minimum in the inflation epoch.
During the inflation the Hubble parameter takes almost a constant value H inf , and the AD fields quickly settle into one of the minima of the scalar potential V with H = H inf : where φ a = ∆,∆,ẽ c , and λ represents the mean value of λ L / and λ ∆ . These minima are determined depending on the values of the parameters in the scalar potential. Specifically, the λ L / -λ ∆ cross term, a L / term and a ∆ term, which are significant for H ≫ M ∆ , m 3/2 , have different dependences on the phases θ a of AD fields. Then, some valleys are formed on the flat manifold so as to minimize the sum of these three terms depending generally on |φ a |, and the potential minima are located along them. Actually, we find the minima with (It should be mentioned for completeness that if λ L / and λ ∆ are rather different from each other, the minimum is formed along one of the flat directions with r e c = 0. We do not consider such cases here.) As for the initial phases, up to the physically irrelevant arbitrary phase of U(1) em gauge transformation they are specified in terms of the U(1) em invariant combinations as θ ∆ .
The dependence of θ (0) a on the parameters c a , λ L / , λ ∆ , a L / , a ∆ is really complicated in contrast to the original one-dimensional Affleck-Dine scenario, unless the fine-tuning, arg(a L / ) − arg(a ∆ ) = π mod 2π, is made so as to align simultaneously the three phase-dependent potential terms.
After the inflation the inflaton oscillates coherently, and it dominates the energy density of the universe. In this epoch of t ≪ M −1 ∆ < m −1 3/2 (H ≫ M ∆ > m 3/2 ), the AD fields are moving toward the origin with the initial conditions at t = t 0 ∼ H −1 inf just after the inflation, The evolution of the AD fields are governed by the equations of motion, The Hubble parameter varies in time as H = (2/3)t −1 in the matter-dominated universe.
The AD fields may be represented suitably in terms of the dimensionless fields χ a [6] as Then, the equations of motion (18) are rewritten with z = ln(t/t 0 ) as and the initial conditions from Eq. (17) are given as The dimensionless effective potential U is given by The second term is due to the time variation of the factor H(M/λ) in Eq. (19), which apparently provides the change of the mass terms in U, The motion of the phases θ a of AD fields is described in this epoch as follows. The initial conditions at t = t 0 (z = 0) are given from Eq. (21) as On the other hand, the asymptotic trajectory of the AD fields is found by the conditions ∂U 1 /∂χ * a = 0 in this epoch with H ≫ M ∆ , m 3/2 as It is remarkable for the multi-dimensional motion of the AD fields with λ L / ∼ λ ∆ that the direction of this trajectory is somewhat different from the initial direction, i.e., This is because the apparent change of the mass terms in Eq. (23) due to the redshift induces the new balance among the λ L / -λ ∆ cross term, a L / term and a ∆ term in U 1 (χ a ), which have different dependences on θ a . (If the fine-tuning is made as arg(a L / ) − arg(a ∆ ) = π mod 2π, the initial balance is maintained independently of |χ a | so as to realize θ That is, in the motion on the multi-dimensional flat manifold the AD fields no longer track exactly behind the decreasing instantaneous minimum of scalar potential V . This is a salient contrast to the usual Affleck-Dine mechanism on the one-dimensional flat direction, where the phase of one AD field is kept constant until it begins to oscillate by the low-energy supersymmetry breaking mass term or the thermal mass term. In this way, even in this very early epoch the lepton number asymmetry really appears due to this phase fluctuation of the AD fields on the multi-dimensional flat manifold.
The lepton number asymmetry is evaluated by combining the contributions of the AD fields as where the particle number asymmetry (particl number − anti-particle number) is calculated with the homogeneous coherent scalar field φ a (t) by ∆n a ≡ n a −n a = i(φ * aφ a −φ * a φ a ).
The resultant lepton number asymmetry is given as in terms of the parameter ǫ L (t) representing the fraction of the lepton number asymmetry with the respective fractions of particle number asymmetries Since the phases of AD fields are fluctuating in this early epoch, as mentioned so far, the lepton number asymmetry is oscillating in time as |ǫ L (t)| ∼ |dθ a /dz| |θ

The Hubble parameter eventually decreases after the inflation, and when it becomes as
the AD fields start to oscillate due to the triplet Higgs mass terms M 2 ∆ (|∆| 2 + |∆| 2 ). The significant torque is also applied to the AD fields by the phase-dependent potential terms which are provided with the superpotential terms∆∆,∆∆e c e c ,∆∆∆∆. Then, in this epoch the AD fields are rotating around the origin, and the lepton number asymmetry soon approaches certain nonzero value as This final lepton number asymmetry is calculated to be ǫ L ∼ 0.1 for the generic choice of the model parameter values with λ L / /λ ∆ ∼ 0.3 − 3, as shown later in the numerical analysis. It should here be noted that once the AD fields are rotated rapidly with frequency ∼ M ∆ , the low-energy soft supersymmetry breaking terms have little effects on the leptogenesis for The coherent oscillation of the inflaton field dominates the energy density of the universe until the decay of the inflatons is completed at the time t R (≫ M −1 ∆ ). Then, the universe is reheated to the temperature T R . Until this time, the lepton number asymmetry is redshifted as matter, which is given for H = H R with Eqs. (30) and (34) as Then, the lepton-to-entropy ratio after the reheating is estimated with s ∼ 3H 2 R M 2 P /T R as where M P = m P / √ 8π = 2.4 × 10 18 GeV is the reduced Planck mass. This lepton number asymmetry is converted partially to the baryon number asymmetry through the electroweak anomalous effect. The chemical equilibrium between leptons and baryons leads the ratio n B ≃ −0.35n L (without any preexisting baryon number asymmetry) [17]. Therefore, the sufficient baryon-to-entropy ratio is provided as required from the nucleosynthesis [18], One may take seriously the non-thermal gravitino production. Then, the reheating temperature may be significantly lower than 10 8 GeV [14]. Even in this case, if λ is small enough, the sufficient baryon number asymmetry can be generated.

Numerical analysis
We have made numerical calculations to confirm the generation of lepton number asymmetry in the present model with triplet Higgs. The values of the model parameters are taken in some reasonable ranges as and [0, 2π] for the phases of coupling parameters. A typical example for the evolution of the AD fields is presented in the following by taking the parameter values rather arbitrarily in the above ranges as where θ (0) ∆ = 0 is chosen by the U(1) em gauge transformation. Then, the asymptotic trajectory of the AD fields in the epoch t 0 < t ≪ M −1 ∆ < m −1 3/2 is determined by the conditions ∂U 1 /∂χ * a = 0 as r (1) It is really observed that the asymptotic phases θ (1) a are in general slightly different from the initial phases θ (0) a in the multi-dimensional motion of the AD fields due to the apparent change of the mass terms in Eq. (23). (It is also checked that if the fine-tuning, arg(a L / ) − arg(a ∆ ) = π mod 2π, is made, the alignment θ  (12) is checked to be hold.) The result is depicted in Fig. 1 in terms of the dimensionless fields χ a for the case of Eq.
(39) with λ L / /λ ∆ = 0.5 and M ∆ = 10 −4 H inf (≫ m 3/2 ). The dots represent the times of t/t 0 = 1, 10, 10 2 , 10 3 , 10 4 , 10 5 . The AD fields really exhibit the behavior as described in the preceding section. Their phases θ a and magnitudes r a = |χ a | normalized in Eq. (19) fluctuate gradually around the asymptotic values in Eq. (41) for t 0 < t < 10 4 t 0 . Then, around t ∼ 10 4 t 0 ∼ M −1 ∆ they begin to rotate around the origin, which appears to be somewhat complicated in the multi-dimensional motion. This motion of the AD fields for t M −1 ∆ is driven mainly by the potential terms provided with the superpotential term M ∆∆ ∆ of triplet Higgs mass.
The fraction of lepton number asymmetry ǫ L (t) in Eq. (31) calculated from the time evolution of the AD fields is shown in Fig. 2 together with the respective particle number asymmetries ǫ a (t) in Eq. (32). (It is checked that the electric charge conservation is hold with ǫ ∆ (t) − ǫ∆(t) + ǫẽc(t) = 0.) The lepton number asymmetry is really oscillating slowly in the time range t 0 < t < 10 4 t 0 , which is due to the motion of the AD fields fluctuating around the asymptotic trajectory. Then, it changes to approach a nonzero value ǫ L ∼ 0.1 for t 10 4 t 0 ∼ M −1 ∆ . We have obtained similar numerical results in most cases by taking randomly about one hundred samples of the parameters in the ranges of Eq. (38). Then, we have confirmed that the minimum during the inflation for the initial values of the AD fields can really be formed on the flat manifold with r It is essential for admitting this sort of multi-dimential motion of the AD fields that the relevant non-renormalizable superpotential terms are comparable, specifically in the present model with rather arbitrary values 0 < c a 1 for the Hubble induced mass terms. This desired range of λ L / /λ ∆ has actually a reasonable size, in contrast to naive expectation, due to the effects of the phase dependent potential terms. If the difference between these couplings is larger than this range, we have found that the AD fields evolve along one of the flat directions as in the usual Affleck-Dine scenario.
As confirmed by these numerical calculations, it is quite an interesting feature of the present Affleck-Dine leptogenesis with triplet Higgs that the significant lepton number asymmetry is generated in the early epoch t ∼ M −1 ∆ through the multi-dimensional motion of the AD fields. Then, for M ∆ ≫ m 3/2 the low-energy supersymmetry breaking terms with m 3/2 have little effect on the leptogenesis . This is because several scalar potential terms are provided for H ∼ M ∆ with the superpotential mass term of triplet Higgs, which have different dependences on the phases of AD fields. The phase rotation of the AD fields for t M −1 ∆ is indeed driven by such terms with M ∆ rather than the low-energy soft supersymmetry breaking terms with m 3/2 .

Thermal Effects
We now consider the thermal effects, which might be suspected to suppress the generation of asymmetry [11,12].
The AD fields acquire the thermal masses from the coupling to the dilute plasma with temperature One can roughly estimate the Hubble parameter H th at the time when the thermal mass terms begin to dominate over the Hubble induced mass terms: where y represents the couplings of the relevant fields with the AD fields. It takes the maximal value as We naturally consider the case of M ∆ > H max th since the very large triplet Higgs mass may be desired for the small neutrino masses, as seen in Eq. (7). Then, the triplet Higgs mass terms dominate over the thermal mass terms. The thermal-log term −aα 2 2 T 4 p ln(|φ a | 2 /T 2 p ) (a ∼ 3C 2 = 6) for the unbroken U(1) I 3 in the SU(2) L may act as negative mass squired term, since the gauge bosons of SU(2) L × U(1) Y /U(1) I 3 decouple by aquiring the large masses from the AD fields. However, if M ∆ > H max th , the coherent AD fields have much more energy density than the dilute plasma, i.e., M 2 ∆ (|∆| 2 + |∆| 2 ) ∼ M 2 ∆ H(M/λ) > T 4 p . Then, the thermal-log term is also much smaller than the triplet Higgs mass terms, and the evaporation of the AD fields is negligible energetically. Therefore, in this preferable case of M ∆ > H max th the leptogenesis is certainly completed in the early epoch ∼ M −1 ∆ before the thermal effects become significant.
If the triplet Higgs mass is rather small as M ∆ < a 1/2 α 2 H max th ∼ 0.1H max th (though not so plausible for the small neutrino masses), the situation of leptogenesis may appear to be rather different. In this case, the negative thermal-log term dominates over the triplet Higgs mass terms. On the other hand, the thermal mass terms may dominate over the thermallog term if the relevant couplings satisfy the condition y 2 T 2 p |φ a | 2 ∼ y 2 T 2 p H(M/λ) > aα 2 2 T 4 p with y|φ a | < T p . The tyical coupling value is y ∼ 10 −4 for H ∼ 10 6 GeV, T R ∼ 10 8 GeV, (M/λ) ∼ 10 20 GeV. It is possible that some of the couplings h, f 1 , f 2 , f 3 in Eq. (2) satisfy this condition for y. In this situation, the thermal mass terms can drive the rotation of the AD fields. The lepton number asymmetry ǫ L (t) is already varying slowly for t > t 0 soon after the inflation, as seen in Fig. 2, through the fluctuation of the AD fields due to the several phase-dependent potential terms. Then, if the evaporation is not significant until the AD fields are rotated some times by the thermal mass terms, as considered in [12], the lepton number asymmetry is fixed to certain nonzero value ǫ L ∼ 0.01 − 0. is primarily concerned here for the small neutrino masses), the significant lepton number asymmetry ǫ L ∼ 0.01 − 0.1 is generally produced on the multi-dimensional flat manifold in the present model with triplet Higgs. This lepton number asymmetry is actually rather independent of the value of M ∆ .

Conclusion
We have examined the Affleck-Dine leptogenesis in the extension of the minimal supersymmetric standard model including a pair of triplet Higgs fields ∆ and∆ with mass M ∆ . The lepton number asymmetry is generated on the multi-dimensional flat manifold consisting of ∆,∆,ẽ c . It is the essential point that several phase-dependent potential terms are provided with the superpotential terms M ∆∆ ∆, (λ L / /2M)∆∆e c e c , (λ ∆ /2M)∆∆∆∆ (λ L / /λ ∆ ∼ 0.3 − 3), which are significant for H ∼ H inf − M ∆ . Then, soon after the inflation the lepton number asymmetry appears since the phases of AD fields fluctuate by the effects of such potential terms. It is slowly oscillating for a certain while, and then the leptogenesis is completed at the early time ∼ M −1 ∆ , when the AD fields begin to rotate around the origin due to the potential terms with triplet Higgs mass. The fraction of the resultant lepton number asymmetry amounts in general to ǫ L ∼ 0.1 rather independently of M ∆ . Hence, in contrast to the usual Affleck-Dine scenario, the low-energy soft supersymmetry breaking terms have little effect on the leptogenesis for M ∆ ≫ m 3/2 . The role of the thermal effects is also different in the present scenario. The case of large triplet Higgs mass with M ∆ > H max th is primarily considered for the small neutrino masses. Then, the leptogenesis is completed at the early time ∼ M −1 ∆ before the thermal effects become significant. On the other hand, even if M ∆ is rather small, the time varying lepton number asymmetry after the inflation is fixed to certain value ǫ L ∼ 0.1 − 0.01 by the rotation of the AD fields due to the thermal mass terms, which may dominate over the negative thermal-log term with suitable values of the relevant couplings.