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Vor 19 Stunden · Rudolf Lipschitz born in Konigsberg. He worked in a variety of fields, ranging from algebraic number theory to analytical mechanics, but is best known for the 'Lipschitz condition' guaranteeing a unique solution to a certain kind of differential equation. More information about: Rudolf Lipschitz
1. Mai 2024 · Lipschitz group. The class of Lipschitz groups (a.k.a. Clifford groups or Clifford–Lipschitz groups) was discovered by Rudolf Lipschitz. In this section we assume that V is finite-dimensional and the quadratic form Q is nondegenerate.
Vor 5 Tagen · Rudolf Lipschitz (1832–1903), Mathematiker; Theodor Litt (1880–1962), Pädagoge; Berthold Litzmann (1857–1926), Germanist; Hugo Loersch (1840–1907), Rechtshistoriker; Georg Loeschcke (1852–1915), klassischer Archäologe; Otto Löwenstein (1889–1965), Begründer der Kinder- und Jugendpsychiatrie; Wolfgang Löwer (* 1946 ...
4. Mai 2024 · We provide a new, short proof of the density in energy of Lipschitz functions into the metric Sobolev space defined by using plans with barycenter (and thus, a fortiori, into the Newtonian–Sobolev space).
Vor 3 Tagen · In mathematical analysis, the Dirac delta function (or δ distribution ), also known as the unit impulse, [1] is a generalized function on the real numbers, whose value is zero everywhere except at zero, and whose integral over the entire real line is equal to one.
22. Apr. 2024 · Definition 1. We say that a convex compact set \ (\mathcal M\subset\mathbb R^n\) satisfies the strong convexity supporting condition for a unit vector \ (p_0\) with radius \ (R>0\) if the set \ (\mathcal M (p_0)\) is a singleton and. $$ \mathcal M\subset \mathcal B_ {R} (\mathcal M (p_0)-Rp_0).$$ (1.1)
21. Apr. 2024 · Abstract. This paper is concerned with first- and second-order optimality conditions as well as the stability for non-smooth semilinear optimal control problems involving the \ (L^1\) -norm of the control in the cost functional.
