Gold 95

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Incomplete Bessel K function/generalized incomplete gamma function

Gold ID: 95
Link: https://sigir21.wmflabs.org/wiki/Incomplete_Bessel_K_function/generalized_incomplete_gamma_function#math.154.0
Formula: $K_{v}(x,y)=\int _{1}^{\infty }{\frac {e^{-xt-{\frac {y}{t}}}}{t^{v+1}}}dt$
TeX Source: K_v(x,y)=\int_1^\infty\frac{e^{-xt-\frac{y}{t}}}{t^{v+1}}dt

Translation Results
Semantic LaTeX	Mathematica Translation	Maple Translations
		-

Semantic LaTeX

Translation: K_v(x , y) = \int_1^\infty \frac{\expe^{-xt-\frac{y}{t}}}{t^{v+1}} \diff{t}
Expected (Gold Entry): K_v(x , y) = \int_1^\infty \frac{\expe^{-xt-\frac{y}{t}}}{t^{v+1}} \diff{t}

Mathematica

Translation: Subscript[\[CapitalKappa], v][x , y] == Integrate[Divide[Exp[- x*t -Divide[y,t]],(t)^(v + 1)], {t, 1, Infinity}, GenerateConditions->None]
Expected (Gold Entry): K[v_, x_, y_] := Integrate[Divide[Exp[- x*t -Divide[y,t]],(t)^(v + 1)], {t, 1, Infinity}]

Maple

Translation: Kappa[v](x , y) = int((exp(- x*t -(y)/(t)))/((t)^(v + 1)), t = 1..infinity)
Expected (Gold Entry)

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