Fig 1.
Examples of cutaneous wounds of the anubis baboon male.
Fig 2.
Wound area, length, and width.
(A) Measurement of wound length and width. (B) Histogram of wound area on the first day (N = 16, S1 Table). Non- Accidental peeling off scabs (APS) cases are shown in white (N = 8), and APS cases are shown in black (N = 8). In the non-APS cases, the median wound area on the first day was 52.6 mm2 (range: 18.9–616.9 mm2) and the median healing time was 9.5 d (range: 6–27 d). Non-APS cases included five of the seven individuals. In eight APS cases, the median wound area on the first day was 165.3 mm2 (range: 25.0–812.3 mm2) and the median healing time was 18.5 d (range: 8–42 d). APS cases included five of the seven individuals. (C) Relationships between wound length and width on the first day of wounding (N = 16, S1 Table). The median length of wounds was 35.2 mm (N = 16, range: 5.5–60.0 mm) and the median width was 6.1 mm (N = 16, range: 2.9–17.9mm).
Table 1.
Coefficients of the generalized additive mixed effect models (GAMMs).
Fig 3.
Relationship between wound area and healing time.
(A) Eight non- Accidental peeling off of scabs (APS) cases (N = 43, S2 Table). The healing curve for each case (black dots and lines), regression curve (bold red lines, Table 1 GAMM-1), and 95% confidence interval (red-shaded area) are shown. The prediction interval (blue dashed lines) is the predicted value ± (SD of model residuals) × 2. We showed the same regression curve and prediction interval is shown in (B)., (B) Eight APS cases (N = 104, S2 Table). Green dots indicate the point at which the scab was peeled off (APS). In five of eight APS cases, multiple measuring days showed APS during the healing process.
Fig 4.
Predicted delay time and Accidental peeling off of scabs (APS).
The bar and vertical line on the bar graph, represent the mean ± SD of the data in each category.
Table 2.
Coefficients of the generalized linear mixed effect models (GLMMs).