Bessel differential equation
linear differential equation of the second order
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Bessel differential equation
Summary
Key Facts
- Friedrich Bessel is named after Bessel differential equation[1].
- Bessel differential equation's GND ID is recorded as 4278526-1[2].
- Bessel differential equation's subclass of is recorded as second order linear differential equation[3].
- Bessel differential equation's defining formula is recorded as x^2 \frac{d^2 y}{dx^2} + x \frac{dy}{dx} + (x^2 - \alpha^2)y = 0[4].
- Bessel differential equation's Google Knowledge Graph ID is recorded as /g/122n5ns6[5].
- Bessel differential equation's MathWorld ID is recorded as BesselDifferentialEquation[6].
- Bessel differential equation's maintained by WikiProject is recorded as WikiProject Mathematics[7].
- Bessel differential equation's Encyclopedia of Mathematics article ID is recorded as Bessel_equation[8].
- Bessel differential equation's Treccani's Enciclopedia della Matematica ID is recorded as equazione-di-bessel[9].
- Bessel differential equation's ScienceDirect topic ID is recorded as mathematics/bessel-differential-equation[10].
- Bessel differential equation's ScienceDirect topic ID is recorded as engineering/bessels-equation[11].