Statistical and radiobiological analysis of the so-called thyroid stunning

Simply assuming Poisson statistics, Brahme and Agren [25] deduced for TCP (initially named eradication probability), a relation that is known widely accepted [28, 29]:

As beta-particles present a low linear energy transfer (LET) and as the effective half-life of ¹³¹I in thyroid is sufficiently large to result in low dose rate, the survival fraction Sf can be approximated by:

Therapeutics ¹³¹I activities still correspond to chemical traces (less than 0.5 μg), thus for each patient, the absorbed dose is proportional to the administered activity, and Sf can be rewritten as:

In addition to the cells radiosensitivity α, the parameter \( \widehat{\alpha} \) also takes into account the uptake and the S factor of the thyroid remnant.

Recent studies [20‐24] using a single administration of 1.11 GBq of ¹³¹I report thyroid remnant control probabilities ranging from 70 to 95 %, i.e.,

Gaussen et al. [26] measured thyroid normal and tumor cells radiosensitivities for low LET from ⁶⁰Co irradiation of 15 cell cultures (5 normal, 6 papillary carcinoma, 1 follicular carcinoma, 3 macrofollicular adenoma, coming from 11 patients). These assays analyzed according to the linear-quadratic model showed that α ranged from 0.37 Gy⁻¹ (most radioresistant tumor cells) up to 0.97 Gy⁻¹ (most radiosensitive normal cells), with a very low β/α value. As beta particles also present a low LET, these α values measured for ⁶⁰Co can be used for ¹³¹I as recommended by ICRP [30]. Furthermore, the quadratic term can be neglected, validating the use of Eq. (2). Lundh et al. [19] showed in thyroid cells assays that the relative biological effectiveness (RBE) of ¹²³I versus ¹³¹I was about 5-fold, resulting in α value for ¹²³I ranging from 1.9 to 4.9 Gy⁻¹. This can be explained by the larger LET of ¹²³I Auger electrons as compared to that of higher energy ¹³¹I beta particles. In addition, a higher LET also induces an even lower β/α value [31].

Lassman et al. [7] measured the uptake in the thyroid remnants of six patients in two consecutive scans after administration of 74 MBq of ¹³¹I (delay 4–6 weeks). They found that the absorbed dose at the first scan ranged from 4 to 38 Gy, corresponding to 0.15 and 1.70 % of the administered activity per gram of tissue, together with a biological half-life larger than 40 days. Rescaled to the standard thyroid mass (20 g), this gives an uptake ranging from 3 to 34 %. This is in line with iodide biokinetics reported from ICRP model giving an uptake of 33 % for a normal thyroid and a biological half-life of 80 days [32].

Hilditch et al. [6] reported the therapeutic to diagnostic uptake ratio of thyroid remnants in 26 and 16 patients using 120 MBq of ¹³¹I and 200 MBq of ¹²³I for the diagnostic scan, respectively. As the thyroid remnant uptakes were not reported, we estimated the cell survival fraction by taking also into account the variability of uptake in thyroid remnants derived in the previous paragraph from [7].

As the biological half-life (>40 days) is much larger than the ¹²⁴I and ¹²³I physical half lives, i.e., 4.18 and 0.55 days, these latter values were used as the effective half-lives in the absorbed dose computation.

Straight inversion of Eq. 1 gives

For 0.02 to 2 g of thyroid remnant, i.e., Nc ∈ [10⁷, 10⁹] [33], Eqs. 4, 5 give

Note that, due to the random nature of energy deposition in cells by the beta particles, a value Nc × Sf significantly lower than one is needed to get more than 70 % of chance to kill all the cells.

Combining Eqs. 3 and 6, we can write

As a result of the 15th root, the survival fraction for 74 MBq only slightly varies in the range of TCP values reported after administration of 1.11 GBq of ¹³¹I.

The same computation for 120 MBq of ¹³¹I gives

Figure 1 shows the predicted survival fraction Sf and the TCP for 10⁷ and 10⁹ cells as functions of the dimensionless variable \( \widehat{\alpha}A \). Note that this figure depends only on the number of cells ,Nc, in the tissue to be controlled and not on the cell type. This last feature only modifies the value of \( \widehat{\alpha} \), or in the other words, the corresponding activity A needed to control the tissue.

Table 1 shows the mean absorbed dose and the cell survival fraction computed assuming uniform absorbed dose for the pre-therapeutic activities administered in Sgouros et al. [27], Lassmann et al. [7], and Hilditch et al. [6]. The mean absorbed dose \( \overline{D} \) was computed using Olinda [18]. Lowest and highest mean absorbed dose values correspond to the minimal and maximal thyroid remnants uptake observed in [7], i.e., 0.15 and 1.7 %/g, respectively. Lowest and highest (italicized in Table 1) cell survival fractions were derived from the combination of the maximal and minimal (italicized in Table 1) absorbed dose and α values, respectively.