A brief glimpse into the past

Maalikooste: LeKi ja Riemu vastakkain Suomi-sarjan viidennessä puolivälieräottelussa
Maalikooste: LeKi ja Riemu vastakkain Suomi-sarjan viidennessä puolivälieräottelussa

LeKi Lempäälästä vei 4–1-voiton jyväskyläläistä Riemua vastaan Suomi-sarjan viidennessä puolivälieräottelussa ja eteni näin ...



Maalikooste 18.11.2023: Titaanit – Riemu @ Vaasan Koulunäkki Areena
Maalikooste 18.11.2023: Titaanit – Riemu @ Vaasan Koulunäkki Areena

Lauantaina 18.11.2023 Kotkassa pelatun Suomi-sarjan runkosarjaottelun Titaanit – Riemu maalikooste. Ottelun maalit: Titaanit ...



Maalikooste 15.10.2023: Riemu – Titaanit @ LähiTapiola Areena
Maalikooste 15.10.2023: Riemu – Titaanit @ LähiTapiola Areena

Sunnuntaina 15.10.2023 Jyväskylässä pelatun Suomi-sarjan runkosarjaottelun Riemu – Titaanit maalikooste. Ottelun maalit: ...



Pyry - Riemu 14.10.2023 - Motorshop-maalikooste
Pyry - Riemu 14.10.2023 - Motorshop-maalikooste

Nokian Pyry vs Riemu Jyväskylästä Suomi-sarjan runkosarjan ottelu. Motorshop Nokia, pienkone- ja veneliike lähellä sinua!



Riemu-RaaheK 3-4
Riemu-RaaheK 3-4

Riemu-RaaheK ottelun maalikoosteen tarjoaa Mekonomen Rannikon Tarvike Oy #suomisarja #RaaheKiekko #raahe.



RaaheK vs. Riemu
RaaheK vs. Riemu

RaaheK - Riemu ottelun maalikoosteen tarjoaa Mekonomen Rannikon Tarvike Oy #suomisarja #RaaheKiekko #raahe.



Pyry - HCIK 3. Puolivälierä Kooste - Suomi-sarja Playoffs 2022-2023
Pyry - HCIK 3. Puolivälierä Kooste - Suomi-sarja Playoffs 2022-2023

Suomi-sarjan puolivälierien kolmas osaottelu Nokian Pyryn ja HC Indians Kaarinan välillä.



Pyry - HCIK 1. Puolivälierä Kooste - Suomi-sarja Playoffs 2023
Pyry - HCIK 1. Puolivälierä Kooste - Suomi-sarja Playoffs 2023

Suomi-sarjan puolivälierien ensimmäinen osaottelu Nokian Pyryn ja HC Indians Kaarinan välillä.



Team, Place & City Details

Hikaru Nakamura
Hikaru Nakamura

Hikaru Nakamura is a Japanese-born American chess Grandmaster. He is a five-time United States Chess Champion, who won the 2011 edition of Tata Steel Chess Tournament Group A and represented the United States at five Chess Olympiads, winning a team gold medal and two team bronze medals.

HC Kometa Brno

HC Kometa Brno is a professional ice hockey team based in Brno, Czech Republic. They play in the Czech Extraliga.

HC Kunlun Red Star

HC Kunlun Red Star is a Chinese ice hockey club that joined the Kontinental Hockey League (KHL) prior to the 2016–17 season.

Hikikomori
Hikikomori

In Japan, hikikomori are reclusive adolescents or adults who withdraw from society and seek extreme degrees of isolation and confinement.

Haiku

Haiku is a short form of Japanese poetry in three phrases, typically characterized by three qualities: The essence of haiku is "cutting" (kiru). This is often represented by the juxtaposition of two images or ideas and a kireji ("cutting word") between them, a kind of verbal punctuation mark which signals the moment of separation and colours the manner in which the juxtaposed elements are related.

Hiccup

A hiccup is an involuntary contraction (myoclonic jerk) of the diaphragm that may repeat several times per minute. The hiccup is an involuntary action involving a reflex arc.

Haikou
Haikou

Haikou is the capital and most populous city of the Chinese province of Hainan. It is situated on the northern coast of Hainan, by the mouth of the Nandu River.

Haikyu!!

Haikyu!! (ハイキュー!!, Haikyū!!, from the kanji 排球 lit.

Hickory, North Carolina
Hickory, North Carolina

Hickory is a city located primarily in Catawba County, with formal boundaries extending into Burke and Caldwell counties. The city lies in the U.S. state of North Carolina.

HCI Equity Partners

HCI Equity Partners is a Washington, DC-based private equity firm with offices in Minneapolis, MN and Chicago, IL as well.

Riemann hypothesis
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. Many consider it to be the most important unsolved problem in pure mathematics .

Riemann zeta function
Riemann zeta function

The Riemann zeta function or Euler–Riemann zeta function, ζ, is a function of a complex variable s that analytically continues the sum of the Dirichlet series ζ ( s ) = ∑ n = 1 ∞ 1 n s , {\displaystyle \zeta (s)=\sum _{n=1}^{\infty }{\frac {1}{n^{s}}},} which converges when the real part of s is greater than 1. More general representations of ζ(s) for all s are given below.

Riemannian manifold

In differential geometry, a Riemannian manifold or Riemannian space is a real, smooth manifold M equipped with a positive-definite inner product gp on the tangent space TpM at each point p. A common convention is to take g to be smooth, which means that for any smooth coordinate chart (U,x) on M, the n2 functions g ( ∂ ∂ x i , ∂ ∂ x j ) : U → R {\displaystyle g\left({\frac {\partial }{\partial x^{i}}},{\frac {\partial }{\partial x^{j}}}\right):U\to \mathbb {R} } are smooth functions.