HighlightsA brief glimpse into the past
Dresdner Eislöwen vs. Starbulls Rosenheim - Pressekonferenz
Hier ist die Pressekonferenz der Partie Dresdner Eislöwen vs. Starbulls Rosenheim vom Spiel 5 der Playoff-Viertelfinal-Serie Die ...
Dresdner Eislöwen vs. Starbulls Rosenheim - Game Highlights
Hier sind die Highlights der Partie Dresdner Eislöwen vs. Starbulls Rosenheim vom Spiel 5 der Playoff-Viertelfinal-Serie ...
Dresdner Eislöwen vs Starbulls Rosenheim Game Highlights Playoff-Viertelfinale Spiel 5
Es ist geschafft! Durch einen 5:1-Sieg in Spiel fünf der Serie gegen die Starbulls Rosenheim stehen wir im Playoff-Halbfinale.
DEL2 Pressekonferenz Viertelfinale Spiel 5: Dresdner Eislöwen vs. Starbulls Rosenheim
Die Pressekonferenz nach dem fünften Viertelfinal-Spiel der Dresdner Eislöwen gegen die Starbulls Rosenheim.
DEL2 Game Highlights Viertelfinale Spiel 5: Dresdner Eislöwen vs. Starbulls Rosenheim
Watch the Game Highlights from Dresdner Eislöwen vs. Starbulls Rosenheim, 03/21/2025.
DEL2: Dresdner Eislöwen vs. Starbulls Rosenheim I Highlights - Playoffs Spiel 5 | SDTV Eishockey
Das sind die Highlights der Partie Dresdner Eislöwen vs. Starbulls Rosenheim im Viertelfinale der Playoffs der DEL2-Saison ...
Highlights I DEL2 Playoffs 2025 Viertelfinale Spiel 4 Starbulls Rosenheim -Dresdner Eislöwen
Highlights I DEL2 Playoffs 2025 Viertelfinale Spiel 4 Starbulls Rosenheim -Dresdner Eislöwen.
Team, Place & City Details
Starbulls Rosenheim
Starbulls Rosenheim is a professional ice hockey team based in Rosenheim, Oberbayern, Germany. They currently play in Oberliga.
Selberg trace formula
In mathematics, the Selberg trace formula, introduced by Selberg , is an expression for the character of the unitary representation of G on the space L2(G/Γ) of square-integrable functions, where G is a Lie group and Γ a cofinite discrete group. The character is given by the trace of certain functions on G. The simplest case is when Γ is cocompact, when the representation breaks up into discrete summands.
Selberg class
In mathematics, the Selberg class is an axiomatic definition of a class of L-functions. The members of the class are Dirichlet series which obey four axioms that seem to capture the essential properties satisfied by most functions that are commonly called L-functions or zeta functions.
Selberg zeta function
The Selberg zeta-function was introduced by Atle Selberg . It is analogous to the famous Riemann zeta function ζ ( s ) = ∏ p ∈ P 1 1 − p − s {\displaystyle \zeta (s)=\prod _{p\in \mathbb {P} }{\frac {1}{1-p^{-s}}}} where P {\displaystyle \mathbb {P} } is the set of prime numbers.
Selberg integral
In mathematics the Selberg integral is a generalization of Euler beta function to n dimensions introduced by Atle Selberg .
Selberg sieve
In mathematics, in the field of number theory, the Selberg sieve is a technique for estimating the size of "sifted sets" of positive integers which satisfy a set of conditions which are expressed by congruences. It was developed by Atle Selberg in the 1940s.
Selberg's zeta function conjecture
In mathematics, the Selberg conjecture, named after Atle Selberg, is a theorem about the density of zeros of the Riemann zeta function ζ. It is known that the function has infinitely many zeroes on this line in the complex plane: the point at issue is how densely they are clustered.
Selberg's 1/4 conjecture
In mathematics, Selberg's conjecture, conjectured by Selberg , states that the eigenvalues of the Laplace operator on Maass wave forms of congruence subgroups are at least 1/4.
Selberg's identity
In number theory, Selberg's identity is an approximate identity involving logarithms of primes found by Selberg . Selberg and Erdős both used this identity to given elementary proofs of the prime number theorem.
Selberg (Kusel)
The Selberg is a hill, 545.1 m, in the county of Kusel in the German state of Rhineland-Palatinate. It is part of the North Palatine Uplands and is a southern outlier of the Königsberg.
Riemann hypothesis
In mathematics, the Riemann hypothesis is a conjecture that the Riemann zeta function has its zeros only at the negative even integers and complex numbers with real part 1/2. It was proposed by Bernhard Riemann , after whom it is named.