Crossword Solver > found answer > COVERI

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Welcome to Anagrammer Crossword Genius! Keep reading below to see if coveri is an answer to any crossword puzzle or word game (Scrabble, Words With Friends etc). Scroll down to see all the info we have compiled on coveri.

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coveri

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The answer COVERI has 0 possible clue(s) in existing crosswords.

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The word COVERI is NOT valid in any word game. (Sorry, you cannot play COVERI in Scrabble, Words With Friends etc)

There are 6 letters in COVERI ( C3E1I1O1R1V4 )

To search all scrabble anagrams of COVERI, to go: COVERI?

Rearrange the letters in COVERI and see some winning combinations

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Scrabble results that can be created with an extra letter added to COVERI

CODRIVE DIVORCE EVICTOR REVOICE VICEROY VOICERS CORVINE

6 letters out of COVERI

VOICER

5 letters out of COVERI

COVER VIREO VOICE

4 letters out of COVERI

CERO CIRE COIR CORE COVE OVER RICE RIVE ROVE VICE VIER

3 letters out of COVERI

COR ICE IRE ORC ORE REC REI REV ROC ROE VIE VOE

2 letters out of COVERI

ER OE OI OR RE

Searching in Dictionaries ...

Definitions of coveri in various dictionaries:

COVERI - In mathematics, more specifically algebraic topology, a covering map (also covering projection) is a continuous function p from a topological space, ...

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Coveri might refer to
In mathematics, more specifically algebraic topology, a covering map (also covering projection) is a continuous function p from a topological space, C, to a topological space, X, such that each point in X has an open neighbourhood evenly covered by p (as shown in the image); the precise definition is given below. In this case, C is called a Covering space and X the base space of the covering projection. The definition implies that every covering map is a local homeomorphism.
* Covering spaces play an important role in homotopy theory, harmonic analysis, Riemannian geometry and differential topology. In Riemannian geometry for example, ramification is a generalization of the notion of covering maps. Covering spaces are also deeply intertwined with the study of homotopy groups and, in particular, the fundamental group. An important application comes from the result that, if X is a "sufficiently good" topological space, there is a bijection between the collection of all isomorphism classes of connected coverings of X and the conjugacy classes of subgroups of the fundamental group of X.
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