The problems of surface magnetism have been investigated for many years. Among them the effects of surface on phase transitions in semi-infinite systems have received increasing interest. Real systems have surfaces, interfaces or boundaries and the translational symmetry is not preserved. This gives a set of surface phase diagrams richer than the infinite bulk one [1] - [4] . The simplest model is to assume that the surface is single planar, which defines the semi-infinite model.

Several experimental studies show a critical behaviour of the surface different than the bulk. As example, we mention the work done on mixed compounds NbSe₂ [5] , NiO (111) [6] and Co/Ni (111) overlayers [7] , on which are observed surface and extraordinary phase transitions. In those cases, the surface has a critical temperature greater than the bulk. In other pure samples of Gd [8] , the surface and the bulk are at the same critical temperature, the transition is ordinary. The practice researches in magneto-electronic and materials using carriers based on spin properties instead of electrons and holes in traditional semiconductors are motivated by the development and application for information storage [9] and other applications in thermo-magnetic recording [10] . In the other hand, the theoretical studies of the critical surface effects have been developed during the last years, using a variety of approximations and mathematical techniques. An interesting literature review of the subject is in the work of K. Binder and Diehl [1] - [3] . The existence and critical behaviour of surface, extraordinary, special [11] [12] and extraordinary phase transitions have been illustrated using different approaches [2] [3] [13] - [16] , and various situations as pure, quenched and random systems at bulk or surface [17] - [20] have been studied. Also, the exact solution of the 2D semi-infinite Ising model has been proved [21] - [24] . The semi- infinite Blume-Capel model was also used to describe the wetting phenomenon. In reference [25] , the authors show that critical wetting in d = 2 is equivalent to a “bulk” critical phenomenon. A detailed study with a rich bibliography is found in reference [26] .

The three-dimensional semi-infinite spin-1 Ising model with a crystal field has been studied [27] . The spin-1 ferromagnetic Ising model with a crystal field has been introduced independently by Blume [28] and Capel [29] and is often called the Blume-Capel (BC) model. An extension of the BC model is the possibility of inclusion of higher spin values. Various types of phase diagram of a three-dimensional semi-infinite ferromagnetic spin-3/2 BC model were obtained within the framework both of the mean field theory and renormalization-group techniques [30] .

In the last years, a great attention has been devoted to systems of mixed spins and this is related to their importance in the study of magnetic materials with ferrimagnetic properties [31] . The system of mixed spins S = 1/2 and S = 1 has been one of the simplest to be studied early and largely, namely by the techniques of renormalization group [32] [33] , the Bethe-Peierls approximation [34] , the effective field theory [35] [36] , the Monte- Carlo simulation [37] [38] and the finite cluster approximation [39] .

Recently, this attention has been expanded on systems of mixed spins higher than 1/2, like the case S = 1 and S = 3/2, which has been also studied by several methods, as the mean field approximation (MF) [40] , the Bethe lattice recursion relations [41] [42] , the effective field theory [43] [44] , the Monte-Carlo simulation [45] , the Green’s function [46] , the recursion relations on Cayley tree [47] and the real space renormalization group theory [48] .

Our aim in this present paper is to determine the various types of phase diagram in the semi-infinite system of mixed spins S = 1 and S = 3/2 on the Blume-Capel model [28] [29] , which we study by using a renormalization group (RG) method, namely the Migdal-Kadanoff one [49] [50] , combining the decimation as well as the bond shifting. Our study focuses on the effect of two different single-ion anisotropies in the phase diagram of the mixed spin-1 and spin-3/2 Ising ferrimagnetic system. We organize our paper as follows. In Section 2, we treat the formalism of our method and we establish the Migdal-Kadanoff recursion equations. In Section 3, we present our results and discuss important points. Finally, we give our conclusion in Section 4.

The calculation of the critical temperature of infinite Blume-Capel model with mixed spins S_A = 1 and S_B = 3 /2 (Section 2.1), in the three-dimensional case d = 3, shows three main types of diagram, labelled I, II and III. These types of diagrams can be classified as follows:

Type I: appears in the diagrams for: (Figure 3 is an example of this type).

Type II: appears in the diagrams for: (Figure 4 is an example of this type).

Type III: appears in the diagrams and for: (Figure 5 is an example of this type).

The phase diagrams in the plane for and for the three-dimensional system are shown in Figure 3. denotes the tricritical temperature for d = 3. This type of diagram is characterized by the transitions of first- and second-order which are separated by the tricritical point.

The second and third types of phase diagrams (Figure 4 and Figure 5) are characterized by the presence of only second-order transitions and they have different shapes.

Using renormalization-group calculations in the semi-infinite case (Section 2.2), we have obtained five generic types of phase diagram, illustrated in the plane for several values of and, reported in Figures 6(a)-(e). They show a variety of ordinary, extraordinary and special phase transitions. To classify the different types of phase diagram, we shall proceed as follows:

1) For and, the surface and the bulk order at the same temperature. The system exhibits only an ordinary phase transition of second order. Figure 6(a) represents a typical phase diagram.

2) For and, we have indicated in Figure 6(b) a typical phase diagram among three qualitative types which have been determined. We have shown ordinary, extraordinary and surface phase transitions of second order. For a particular value of there exist a special point S characterizing the phase transition.

3) For and, the surface and the bulk order at the same temperature.

This ordinary phase transition can be first-order, second-order or tricritical. Figure 6(c) represents a typical phase diagram.

4) For and, we can observe ordinary first-order, ordinary second- order, extraordinary second-order and surface second-order phase transitions. For two particular values of, we can also observe an ordinary tricritical point and a multicritical point. A typical phase diagram showing the various phase transitions is represented in Figure 6(d).

5) For and, we can observe ordinary first-order, extraordinary second-order and surface second-order phase transitions. For a particular value of, we can also observe a special tricritical point. Figure 6(e) represents a typical phase diagram.

Thereafter, we present the phase diagrams in the plane. In addition to the five phase diagrams found in the plane, we have obtained four generic types of phase diagrams. Figure 7 shows the dependence of the critical temperature on for different values of the parameters and. We show a variety of phase transitions associated with the surface, including certain types of ordinary, extraordinary and special phase transitions. To classify the different types of phase diagrams, we shall proceed as follows:

a) For and, the system exhibits only an ordinary phase transition of second order. Figure 7(a) represents a typical phase diagram.

b) For and, the corresponding phase diagram is characterized by extraordinary and surface second-order phase transitions. A typical phase diagram showing the various phase transitions is represented in Figure 7(b).

c) For and, we have indicated in Figure 7(c) a typical phase diagram among three qualitative types which have been determined. We have shown ordinary, extraordinary and surface phase transitions of second-order. For two particular values of there exist two special points (and) characterizing the special phase transition, where a second-order transition line meets two second-order transition lines, particularly lines of extraordinary and surface transitions. At these special points the surface and the bulk of the system become ordered simultaneously.

d) For and, we obtain three main qualitative types of phase diagrams; one of them is reported in Figure 7(d). It shows ordinary, extraordinary and surface phase transitions of second-order. The three transition lines meet at two special phase transition points (and).

Let us comment the types of phase diagrams obtained by Migdal-Kadanoff renormalization:

1) The presence of a semi infinite surface gives rise to a variety of new phase diagrams. Are highlighted, ordinary transitions (e.g. Figure 6(a)), extraordinary transitions (Figure 6(b)), surface transitions (Figure 7(b)) and special transitions (Figure 7(d)).

2) Each of these phase transitions is represented by a different fixed point, and that they belongs to a new universality class different from that of the bulk. For example, the surface performs two different types of second order phase transitions. The first has a temperature higher than that of the bulk; this surface transition is described by the fixed point (O_B, C_S), where O_B is the fixed point (disorder) of the bulk [48] , and C_S is that of the surface: C_S (J_S = 1.55, K_S = 0, Δ_A(S) = ¥. Δ_B(S) = −¥, C_S = −0.47). The second possible transition occurs at the same temperature as that of the bulk; it is the special transition, represented by another different fixed point (C_B, C_Sp). C_B is the second order fixed point of the bulk [48] , and C_Sp the surface one with coordinates C_Sp (J_S = 1.29, K_S = 0, Δ_A(S) = ¥, Δ_B(S) = −¥, C_S = −0.074).

3) The topology of the phase diagrams obtained is compared with that already established in the references [57] [58] for pure semi infinite BC models with S = 1 and S = 3/2. As in the infinite case [53] , this similarity is the result of the competition effects of the two different anisotropies in the system. For example, Figures 6(c)-(e) remind types obtained in reference [58] by the same approximation for the spin model S = 1. Whereas Figures 7(a)-(d) are to be compared with the results [30] of the pure semi infinite BC model with S = 3/2. The remaining two diagrams, Figure 6(a) & Figure 6(b), are non existing types for the same model with spin S = 1 or S = 3/2 by the Migdal-Kadanoff renormalization approach.

4) In these types of phase diagrams obtained by using the Migdal-Kadanoff approximation, we note the absence of successive (surface/bulk) first order phase transitions and only the successive (surface/bulk) second-order phase transitions can occur. Also, simultaneous phase transitions of different orders are not observed. This was already met in the study of pure semi infinite models, see references [32] [57] [58] . But, the mean field theory finds such situations [30] [59] .

Lipowski had already mentioned the expected difference between the two approaches (MF and RG), in the study of semi infinite Potts model [60] . In fact the mean field treats the bulk as field acting on the surface and the surface order parameter can cause a non ordinary first order phase transition. In the Migdal-Kadanoff renormalization procedure, the fixed point surface obeys the bond-moving relation (15). When the bulk fixed point is at a finite temperature, the surface may converge to a finite fixed point and have a surface transition. While, if the bulk fixed point is at T = 0 K (J_B infinite), the surface one is also at 0 K. In particular, the fixed point of the bulk first order phase transition is precisely at 0 K, which causes ordinary first order transitions at surface.

The experimental results confirm the existence of a continuous transition at surface, while the bulk exhibit simultaneously a first order transition, what is called in the literature “surface induced disordering” (SID). This type of transition was highlighted in the Cu3Au alloy, see reference [61] . It has been observed that when the bulk exhibits a first order transition, the order parameter of the surface vanishes continuously and in reference [62] , a theoretical study has been made using landau free energy. For a complete comparison, it is interesting to treat this model by the mean field approximation and to compare the types of phase diagrams with those obtained by renormalization.

During this work, we have studied the pure Blume-Capel model in the semi-infinite case. To achieve our goal, we have determined the global phase diagrams of the mixed spin-1 and spin-3/2 in the semi-infinite system with different single-ion anisotropies acting on the spin-1 and spin-3/2 (on the surface and in the bulk) by using the Migdal-Kadanoff renormalization group technique, which combines decimation (with a space scale ration b = 3) and bond shifting. In the phase diagrams, the critical temperature lines versus single-ion anisotropies are shown. We have classified the various phase diagrams at fixed and, finding new types of phase diagrams featuring a variety of phase transitions and multicritical points .

A comparison with the types of phase diagrams in the pure semi-infinite model with S = 1 and S = 3/2 obtained by the renormalization and the mean field approaches was performed.

In perspective, we hope that this work could stimulate further theoretical and experimental works on ferrimagnetic systems such as mixed spins with random fields in finite, infinite and semi-infinite systems.

Mohamed El Bouziani,Mohamed Madani,Abou Gaye,Abdelhameed Alrajhi,1 1, (2016) Phase Diagrams of the Semi-Infinite Blume-Capel Model with Mixed Spins (SA = 1 and SB = 3/2) by Migdal Kadanoff Renormalization Group. World Journal of Condensed Matter Physics,06,109-122. doi: 10.4236/wjcmp.2016.62015