Examples of 'idempotent' in a sentence
Meaning of "idempotent"
idempotent (adjective): Referring to an operation or function in mathematics or computing that produces the same result regardless of how many times it is applied
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- (said of a function) Such that, when performed multiple times on the same subject, it has no further effect on its subject after the first time it is performed.
- (said of an element of an algebraic structure with a binary operation, such as a group or semigroup) Such that, when it operates on itself, the result is equal to itself.
- (said of a binary operation) Such that all of the distinct elements it can operate on are idempotent (in the sense given just above).
- (said of an algebraic structure) Having an idempotent operation (in the sense given above).
How to use "idempotent" in a sentence
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idempotent
Recall that idempotent means that and.
A band is a semigroup the operation of which is idempotent.
An idempotent quantale is a quantale whose multiplication is idempotent.
Therefore the operation can be termed as idempotent.
Prove that an idempotent is a projection if and only if.
Opening and closing are called idempotent operations.
One example of an idempotent element is a projection in linear algebra.
Both the real and complex functions are idempotent.
A bounded semilattice is an idempotent commutative monoid.
The idempotent endomorphisms of a vector space are its projections.
Is the conjunction of idempotent left and idempotent right.
A dense relation that is also transitive is said to be idempotent.
A right irreducible idempotent is an idempotent a for which aR is a simple module.
A semilattice is a semigroup whose operation is idempotent and commutative.
Idempotent matrices arise frequently in regression analysis and econometrics.
See also
Any safe method is also idempotent.
Managing the data state of idempotent services is the only complexity.
Gets should be safe and idempotent.
All idempotent maticies of less than full rank are positive semidefinite.
It runs every five minutes and is completely idempotent.
Operations are idempotent in nature.
So the cofinality operation is idempotent.
Idempotent matrices have characteristic roots that are either zero or one.
Opening and closing are idempotent.
Idempotent of a code.
The operation ki kckc is idempotent.
The oplog contains an ordered set of idempotent operations that are replayed on the secondaries.
An element of a ring that is equal to its own square is called an idempotent.
The state is idempotent.
It follows that every nonempty periodic semigroup has at least one idempotent.
Each step is idempotent.
Commutative idempotent quasigroups satisfying this additional property are called Steiner quasigroups.
So post is not idempotent.
Trivial examples of idempotent functions on S are the identity map and the constant maps.
We note that the possible limits are any central idempotent state.
We show that this operator is idempotent and its fixed points are the hierarchical watersheds.
This relation gives a bijection between involutory matrices and idempotent matrices.
It is projective if the only idempotent operations in Polr are projections.
In any case it is a good practice to design Events as an idempotent operation.
Definition of idempotent in the HTTP specification.
GET and HEAD are safe and idempotent.
Abelian ring A ring in which all idempotent elements are central is called an Abelian ring.
DSC configurations are idempotent.
String not idempotent under Unicode NFKC normalization.
Anonymity is idempotent.
Therefore, in one embodiment, it is necessary that such multicasts be idempotent.
A ring in which all elements are idempotent is called a Boolean ring.
For example, an idempotent element of a matrix ring is precisely an idempotent matrix.
This is where the pattern of the Idempotent Producer comes in.
An idempotent matrix is always diagonalizable and its eigenvalues are either 0 or 1.
