2.1. Problem description

In order to prevent buckling of the pellet cladding due to different thermal expansion of the materials, a certain gap (x_g) is reserved between a fuel rod and its outer sleeve assembly, as shown in Fig.1.

Fig.1Full-screen View

Schematic view of end plug - end seat reserved space

2.2. Theoretical calculation of the critical stress

For cylindrical shell, a dimensionless shell length parameter χ = l²/(Rt) is incorporated, where, R is radius of the cylindrical shell middle surface, l is the cylindrical shell length, and t is the thickness. Axial cylindrical shells are classified into three categories,^[5] i.e. slender cylindrical shell (χ ≤3.018), middle length (χ >3.018), and short cylindrical shell (χ ≥8.069R²/t²). When the fuel rod axially fixed, it is subjected to axial force. For the three kinds of cylindrical shells with axial compression model, the critical stress can be calculated as follows:

For the slender cylindrical shell, the critical pressure load σ_cr can be obtained by the formula of Euler beam,

where, E is elastic or Young's modulus; I = π(D⁴−d⁴)/64 is the cross sectional moment of inertia, with d and D being the internal and external diameters of cylindrical shells, respectively; A is the cross-sectional area of cylindrical shell; and μ is length factor.

The critical load of the cylindrical shell can be calculated by Eq.(2) [12],

For middle or short length cylindrical shell, Eq.(3) can be applied based on the Donnell linear theory ^[3],

where, D'= Et³/[12(1− υ²)] is bending stiffness of cylindrical shell, with E being the elastic modulus and υ the Poisson' ratio; w is the lateral displacement, x is the axial coordinate, t is thickness of the cylindrical shell, R is the medium radius, and σ_x is the axial stress.

By solving Eq.(3), the critical stress σ_cr is obtained.

However, the theoretical and experimental results are of great error ^[3]. Generally, an empirical formula is used to calculate the critical stress of a cylindrical shell of medium length:

3.1. Temperature distribution of fuel cladding

The following formulas can be derived by the steady state heat transfer equation ^[16],

where, q_Lis the fuel rod linear power density (W/mm) calculated by reactor physics analysis; Q = ρAV is mass flow (g/s), with ρ, A and V being fluid density, the single flow channel area and the flow velocity, respectively; C_LBE is the specific heat capacity (J·g⁻¹·°C) of coolant (lead bismuth eutectic) at constant pressure; λ_c is the thermal conductivity (W·mm⁻¹·°C⁻¹) of 316L; R' is the thermal resistance (°C/W); Φ is the heat flux (W); T_o is the outlet temperature (°C) and T_i is the inlet temperature (°C).

By Eq.(6), the temperature distribution of coolant can be calculated by:

The heat balance equation is written as:

So, ΔT_θ= q_LL /(αΩ), where, ΔT_θ is the film temperature pressure of coolant and cladding, α is the convective heat transfer coefficient, and Ω is the heat transfer area (mm²) of the heat exchange.

And thus the temperature of outer surface of the shell is obtained by:

where, T is the temperature of coolant ^[17].

Through the discrete solution of Eq.(9), the temperature distribution of the cladding from Eq.(9) is shown in Fig.3.

Fig.3Full-screen View

Cladding temperature along the axis.

By Eq.(6), the temperature difference between inner and outer surface of fuel cladding can be derived as

From Eq.(10), the temperature difference is 2°C to 3°C. Thus, it can be neglected, and the average temperature of inner and outer surface of fuel cladding can be used as the cladding temperature. The temperature function of T = 0.16x + 296.3 is obtained by fitting the data in Fig.3.

3.2. Calculation of the gap for axial expansion of cladding

Radial deformation of the 0.5-mm thick cladding is negligible, and the deformation of cladding is just axial deformation. If the shell deformation by thermal expansion is more than the reserve space of the upper end, the cladding can produce extrusion stress. The gap calculation is discussed as follows.

Thermal expansion coefficients of 316L at different temperatures in Table 1 can be fitted by K(T) = 4×10⁻⁹T + 16.5×10⁻⁶.

In this paper, the thermal expansion is obtained from ASME code, section 2^[15]. The calculation length of the cladding and the outer sleeve is L=1675 mm. For Δx, the thermal expansion can be written as Δδ=K(T) ΔxΔT, where ΔT = T−25 is the temperature changes by setting reference temperature at 25°C..

For the active region, the total deformation is

On substituting the parameters into Eq.(11), we have δ_active= 4.562 mm.

In addition to active region of the fuel rod, the lengths of upper and lower non-active region of the cladding are calculated to be L_lower = L_upper = 575 mm. In the active region, the cladding temperature change is so small that the expansion can be calculated based on the average temperatures,

where, K₃₀₀ and K₄₂₁ is the thermal expansion coefficient of the lower and upper parts.

By applying a fixed constraint to the lower end of cladding and the temperature function in Fig.3, the displacement of cladding in the active region can be calculated by the ANSYS code (Fig.4).

Fig.4Full-screen View

The ANSYS-simulated displacement of cladding in axial direction.

Comparing simulation results in Fig.5 with the calculation results, we can see that the radial thermal deformation has a greater influence than the axial thermal deformation, and thus

Fig. 5Full-screen View

The displacement contour of the outer sleeve at axial direction

From thermal hydraulic calculation, the outer sleeve temperature distributes linearly, and temperature changes of the outer sleeve can be obtained by Eq.(13),

Taking Eq.(13) into Eq.(11), the thermal deformation is 5.107 mm.

Thermal deformations of the outer sleeve calculated by the ANSYS code are shown in Fig.5. Through linear buckling analysis using the ANSYS code, critical stresses of the cladding under axial compression are shown in Fig.6.

Fig. 6Full-screen View

The critical stress of the linear buckling for cladding.

3.3. Analysis and discussion of the result

Because of the calculation results of ANSYS taking into account the influence of the radial to the axial direction, the total deformation of the cladding is 2.09 mm larger than that of the outer sleeve.

Tuckling critical stresses calculated using Eq.(1) and APDL ANSYS code are 9.33 and 1.04 MPa, respectively; while the critical stress of cladding collapse calculated using Eq.(2) is 37.7 MPa

The three calculation methods above can obtain critical stress of cladding failure, with the empirical formula of Eq. (2) giving the largest result. In the reactor, the fuel rod load in addition to the axial pressure include the coolant and chamber gas, so the balance of radial load increases the structure stability. Therefore, the gap is calculated using Eq. (2).

According to the critical stress, the average strain can be estimated at

Then the allowed compress value of the fuel rods is ΔL=εL=0.23 mm. Therefore, to prevent the fuel rod buckling, the gap range is 1.86~2.09 mm.