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91 triples
GPTKB property

Alternative names (6)
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Random triples
Subject Object
gptkb:CityPersons_Dataset https://arxiv.org/abs/1702.05693
gptkb:Inverse_chi-squared_distribution f(x; ν) = (2^{−ν/2}/Γ(ν/2)) x^{−(ν/2)−1} exp(−1/(2x))
gptkb:Shap-E_(2023) https://arxiv.org/abs/2305.02463
gptkb:exponential_distribution lambda * exp(-lambda * x)
gptkb:Multinomial_naive_Bayes gptkb:A_Comparison_of_Event_Models_for_Naive_Bayes_Text_Classification
gptkb:Fisher–Snedecor_distribution f(x; d1, d2) = [d1^{d1/2} d2^{d2/2} x^{(d1/2)-1}] / [B(d1/2, d2/2) (d1 x + d2)^{(d1+d2)/2}]
gptkb:univariate_t-distribution f(x) = Γ((ν+1)/2) / (√(νπ) Γ(ν/2)) (1 + x²/ν)^(-(ν+1)/2)
gptkb:Multinomial_Naive_Bayes gptkb:A_Comparison_of_Event_Models_for_Naive_Bayes_Text_Classification
gptkb:chi-squared_distribution (1/(2^{k/2}Γ(k/2))) x^{(k/2)-1} e^{-x/2}
gptkb:Pearson_type_VII_distribution has heavy tails
gptkb:YOLOX https://arxiv.org/abs/2107.08430
gptkb:triangular_distribution piecewise linear
gptkb:Onyx_Boox_Tab_X yes
gptkb:Noncentral_chi-squared_distribution Involves modified Bessel function
gptkb:chi_distribution (1/2^{k/2-1} Gamma(k/2)) x^{k-1} e^{-x^2/2}
gptkb:Normal_distribution_(standard_parameterization) f(x) = (1/(σ√(2π))) * exp(- (x-μ)^2 / (2σ^2))
gptkb:DeBERTa-Large https://arxiv.org/abs/2006.03654
gptkb:DINOv2 https://arxiv.org/abs/2304.07193
gptkb:Fréchet_distribution f(x; α, s, m) = (α/s) ((x-m)/s)^(-1-α) exp(-((x-m)/s)^(-α)) for x > m
gptkb:T5-Small gptkb:Exploring_the_Limits_of_Transfer_Learning_with_a_Unified_Text-to-Text_Transformer