A brief glimpse into the past

frog's top 4-star predictions for the next hour include:

🇰🇿Kyzylzhar Academy v Taraz-Karatau 2
⚽Slovenia U19 Women v Russia U19 Women
🇮🇳Railway v United SC
🇮🇳Bhawanipore v Southern Samity
⚽Belgium U19 Women v Germany U19 Women

frog's top 4-star predictions for the next hour include: 🇰🇿Kyzylzhar Academy v Taraz-Karatau 2 ⚽Slovenia U19 Women v Russia U19 Women 🇮🇳Railway v United SC 🇮🇳Bhawanipore v Southern Samity ⚽Belgium U19 Women v Germany U19 Women



Rajasthan Royals v Punjab Kings in #IPL2021 Today👇👇
 
Which side will come up trumps today at Dubai🤔🤔

#PBKS #RR #HallaBol #SaddaPunjab in #IPL2021 Today👇👇

Rajasthan Royals v Punjab Kings in #IPL2021 Today👇👇 Which side will come up trumps today at Dubai🤔🤔 #PBKS #RR #HallaBol #SaddaPunjab in #IPL2021 Today👇👇



RATIBA LEO ◾#SerieA 🇮🇹 Bologna v Genoa Atalanta v Sassuolo Fiorentina v Inter ◾#LaLiga 🇪🇸 Getafe v Atlético Madrid A. Bilbao v Rayo Vallecano Levante v Celta Vigo ◾#EFL 🏴󠁧󠁢󠁥󠁮󠁧󠁿 Fulham v Leeds Norwich v Liverpool Man City v Wycombe ✍️ Amkeni tuandae mikeka sasa...



📈 Today's Trending Fixtures

🇮🇹 Bologna v Genoa
🇪🇸 Getafe v Atletico
🇸🇬 Tampines v Home 
🇮🇹 Fiorentina v Inter
🇮🇹 Atalanta v Sassuolo
🇪🇸 Athletic v Rayo
🇪🇸 Levante v Celta
🇰🇷 Gwangju v Jeonbuk
🇲🇳 Falcons v Athletic
🇨🇳 Meizhou v Nanjing

📈 Today's Trending Fixtures 🇮🇹 Bologna v Genoa 🇪🇸 Getafe v Atletico 🇸🇬 Tampines v Home 🇮🇹 Fiorentina v Inter 🇮🇹 Atalanta v Sassuolo 🇪🇸 Athletic v Rayo 🇪🇸 Levante v Celta 🇰🇷 Gwangju v Jeonbuk 🇲🇳 Falcons v Athletic 🇨🇳 Meizhou v Nanjing



▶️ Punjab Kings v Rajasthan Royals 👀 It's only been two days back at the #VIVOIPL, and we've already had so much drama! What will today bring? 🏏 Our cricket expert The Edge previews with a pitch report and in-running strategy👇



AFC Cup 2021 Al Kuwait vs Al Salt 7.0°E 11052 V 7200 4.2.0 id: CHEVC 3 cw:20 21 AF F0 CC 21 09 F6



📋 Today's fixtures:

🇮🇹 Bologna v Genoa
🇮🇹 Atalanta v Sassuolo
🇮🇹 Fiorentina v Inter

🇪🇸 Getafe v Atlético Madrid
🇪🇸 A. Bilbao v Rayo Vallecano
🇪🇸 Levante v Celta Vigo

🏴󠁧󠁢󠁥󠁮󠁧󠁿 Fulham v Leeds
🏴󠁧󠁢󠁥󠁮󠁧󠁿 Norwich v Liverpool
🏴󠁧󠁢󠁥󠁮󠁧󠁿 Man City v Wycombe

Not bad 😍

📋 Today's fixtures: 🇮🇹 Bologna v Genoa 🇮🇹 Atalanta v Sassuolo 🇮🇹 Fiorentina v Inter 🇪🇸 Getafe v Atlético Madrid 🇪🇸 A. Bilbao v Rayo Vallecano 🇪🇸 Levante v Celta Vigo 🏴󠁧󠁢󠁥󠁮󠁧󠁿 Fulham v Leeds 🏴󠁧󠁢󠁥󠁮󠁧󠁿 Norwich v Liverpool 🏴󠁧󠁢󠁥󠁮󠁧󠁿 Man City v Wycombe Not bad 😍



Serie A: Bologna v Genoa 1.5u - BTTS: Yes @ $1.81 (Betfair 5% commission)



Team, Place & City Details

Arvydas Novikovas
Arvydas Novikovas

Arvydas Novikovas is a Lithuanian professional footballer who plays as a winger for Ekstraklasa club Legia Warsaw.

Novikov self-consistency principle

The Novikov self-consistency principle, also known as the Novikov self-consistency conjecture and Larry Niven's law of conservation of history, is a principle developed by Russian physicist Igor Dmitriyevich Novikov in the mid-1980s. Novikov intended it to solve the problem of paradoxes in time travel, which is theoretically permitted in certain solutions of general relativity that contain what are known as closed timelike curves.

Novak

Novak , Novák (in Hungarian, Czech and Slovak), Nowak or Novack (in German and Polish) is a surname and masculine given name, derived from the slavic word for "new" (e.g. Polish: nowy, Czech: nový, Serbo-Croatian: nov / нов), which depending on the exact language and usage, translates as "novice", "new man", "newcomer", or "stranger".

Novikov conjecture

This page concerns mathematician Sergei Novikov's topology conjecture. For astrophysicist Igor Novikov's conjecture regarding time travel, see Novikov self-consistency principle.The Novikov conjecture is one of the most important unsolved problems in topology.

Novikov

Novikov, Novikoff or Novikova (feminine) is one of the most common Russian surnames. Derived from novik - a teenager on military service who comes from a noble, boyar or cossack family in Russia of 16th-18th centuries.

Alexander Novikov
Alexander Novikov

Alexander Alexandrovich Novikov was the Chief marshal of the aviation for the Soviet Air Force during Russia's involvement in the Second World War. Lauded as "the man who has piloted the Red Air Force through the dark days into the present limelight" and a "master of tactical air power", he was twice given the title of Hero of the Soviet Union, as well as a number of other Soviet decorations.

Novi Kozarci
Novi Kozarci

Novi Kozarci is a village in Serbia. It is located in the Municipality of Kikinda, North Banat District, Autonomous Province of Vojvodina.

Novikov ring

In mathematics, given an additive subgroup Γ ⊂ R {\displaystyle \Gamma \subset \mathbb {R} } , the Novikov ring Nov ⁡ {\displaystyle \operatorname {Nov} (\Gamma )} of Γ {\displaystyle \Gamma } is the subring of Z [ [ Γ ] ] {\displaystyle \mathbb {Z} [\![\Gamma ]\!]} consisting of formal sums ∑ n γ i t γ i {\displaystyle \sum n_{\gamma _{i}}t^{\gamma _{i}}} such that γ 1 > γ 2 > ⋯ {\displaystyle \gamma _{1}>\gamma _{2}>\cdots } and γ i → − ∞ {\displaystyle \gamma _{i}\to -\infty } . The notion was introduced by S. P. Novikov in the papers that initiated the generalization of Morse theory using a closed one-form instead of a function.

Novikov–Veselov equation

In mathematics, the Novikov–Veselov equation is a natural (2+1)-dimensional analogue of the Korteweg–de Vries (KdV) equation. Unlike another (2+1)-dimensional analogue of KdV, the Kadomtsev–Petviashvili equation, it is integrable via the inverse scattering transform for the 2-dimensional stationary Schrödinger equation.

Novikov–Shubin invariant

In mathematics, a Novikov–Shubin invariant. introduced by Sergei Novikov and Mikhail Shubin , is an invariant of a compact Riemannian manifold related to the spectrum of the Laplace operator acting on square-integrable differential forms on its universal cover.