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- Bessel_potential abstract "In mathematics, the Bessel potential is a potential (named after Friedrich Wilhelm Bessel) similar to the Riesz potential but with better decay properties at infinity. If s is a complex number with positive real part then the Bessel potential of order s is the operator where Δ is the Laplace operator and the fractional power is defined using Fourier transforms.".
- Bessel_potential wikiPageID "24696809".
- Bessel_potential wikiPageRevisionID "450910747".
- Bessel_potential first "E.D.".
- Bessel_potential first "L.I.".
- Bessel_potential first "R.".
- Bessel_potential hasPhotoCollection Bessel_potential.
- Bessel_potential id "B/b015870".
- Bessel_potential id "B/b110420".
- Bessel_potential id "B/b120170".
- Bessel_potential last "Duduchava".
- Bessel_potential last "Hedberg".
- Bessel_potential last "Solomentsev".
- Bessel_potential title "Bessel potential operator".
- Bessel_potential title "Bessel potential space".
- Bessel_potential subject Category:Fractional_calculus.
- Bessel_potential subject Category:Partial_differential_equations.
- Bessel_potential subject Category:Potential_theory.
- Bessel_potential subject Category:Singular_integrals.
- Bessel_potential type Abstraction100002137.
- Bessel_potential type Calculation105802185.
- Bessel_potential type Cognition100023271.
- Bessel_potential type Communication100033020.
- Bessel_potential type DifferentialEquation106670521.
- Bessel_potential type Equation106669864.
- Bessel_potential type HigherCognitiveProcess105770664.
- Bessel_potential type Integral106015505.
- Bessel_potential type MathematicalStatement106732169.
- Bessel_potential type Message106598915.
- Bessel_potential type PartialDifferentialEquation106670866.
- Bessel_potential type PartialDifferentialEquations.
- Bessel_potential type ProblemSolving105796750.
- Bessel_potential type Process105701363.
- Bessel_potential type PsychologicalFeature100023100.
- Bessel_potential type SingularIntegrals.
- Bessel_potential type Statement106722453.
- Bessel_potential type Thinking105770926.
- Bessel_potential comment "In mathematics, the Bessel potential is a potential (named after Friedrich Wilhelm Bessel) similar to the Riesz potential but with better decay properties at infinity. If s is a complex number with positive real part then the Bessel potential of order s is the operator where Δ is the Laplace operator and the fractional power is defined using Fourier transforms.".
- Bessel_potential label "Bessel potential".
- Bessel_potential sameAs m.08080pn.
- Bessel_potential sameAs Q4896404.
- Bessel_potential sameAs Q4896404.
- Bessel_potential sameAs Bessel_potential.
- Bessel_potential wasDerivedFrom Bessel_potential?oldid=450910747.
- Bessel_potential isPrimaryTopicOf Bessel_potential.