Table 3.

Fall risk classification models

Author	Model	Acc (%)	Sen (%)	Spe (%)
Bautmans et al. [40]	logistic regression analysis, ROC	77.0	78.0	78.0
Bizovska et al. [43]	logistic regression analysis, ROC	–	53.0	85.0
Buisseret et al. [64] ^a	binary classification, ROC	85.7	50.0	73,9
Greene et al. [55]	ROC	79.7	73.1	82.6
Gietzelt et al. [36]	decision tree	75.0	78.2	71.2
Howcroft et al. [56]	support vector machine and neural networks	80.0–84.0	50.0–66.7	89.5
Hua et al. [41]	random forests	73.7	81.1	–
Ihlen et al. [44]	Partial Least Square Regression Analysis	76.0 (SF) 68.0 (MF)	71.0 (SF) 67.0 (MF)	80.0 (SF) 69.0 (MF)
Ihlen et al. [49]	Partial Least Square Discriminatory Analysis	–	59.0–88.0	77.0–92.0
Iluz et al. [35]	Ada Boost, Support Vector Machine, Bag, Naïve Bayes	87.1–90.6	83.8–89.2	87.2–94.4
Marschollek et al. [62]	logistic regression, classification model	70.0	58.0	78.0
Marschollek et al. [61] ^a	classification trees	90.0	57.7	100.0
Qui et al. [50] ^a	logistic regression, Naïve Bayes, decision tree, boosted tree, random forest, support vector machine	79.7–89.4	87.2–92.7	69.2–84.9
Rivolta et al. [19] ^a	linear model, artificial neural network	–	71.0–86.0	81.0–90.0
Sample et al. [58] ^a	stepwise logistic regression, max-rescaled R² value	–	48.1	82.1
Senden et al. [51]	linear regression analysis, ROC	–	76.0	70.0
van Schooten et al. [52]	logistic regression analysis, ROC	–	67.9	66.3
Weiss et al. [54] ^a	binary logistic regression analysis	71.6	62.1	78.9
Weiss et al. [53]	binary logistic regression analysis	87.8	91.3	83.3

^a These models also include data of clinical assessment (e. g. body mass index)

Acc: accuracy, Sen: sensitivity, Spe: specificity, ROC: receiver operating curve, SF: single faller, MF: multiple faller