Examples of 'topological' in a sentence
Meaning of "topological"
topological (adjective) - relating to the branch of mathematics that deals with the properties of space that are preserved under continuous deformations, such as stretching or twisting
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- Of or relating to topology.
- Equipped with a topology that is typically required to be compatible with the underlying structure in some way.
How to use "topological" in a sentence
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topological
An orbispace is to topological spaces what an orbifold is to manifolds.
Interconnection networks and their topological properties.
Topological defects in nematic droplets of hard spherocylinders.
It is an example of a compact topological manifold without boundary.
Topological entropy is an invariant of topological dynamical systems.
You know our topological studies are right.
Topological estimation is by now quite well understood.
We want to give a topological interpretation of these spaces.
Inference and disclosure of sensitive topological information.
An orbispace is a topological generalization of the orbifold concept.
Every metric space is also a topological space.
Compact paratopological groups are automatically topological groups.
We also present a prototype of topological interlocking masonry.
A simple topological game with increasing complexity.
This is a locally convex topological vector space.
See also
The topological notion of a quotient is fairly simple.
Any product of compact topological spaces is compact.
The topological stability of the solutions is discussed.
His research looked at topological quantum computation.
Ordinary strings on special backgrounds are never topological.
Category of topological spaces with base point.
Every uniform space is also a topological space.
Bioengineering and topological optimization involving composites.
This makes it a simple example of a topological graph.
Checking the topological connectedness of said component.
Such a measure is invariant under topological deformations.
Suppose is a topological space and is an equivalence relation on.
Such spaces are called finite topological spaces.
This is a series of topological relations of being within or upon.
This page discusses a class of topological groups.
Further also topological information could be used.
It is common to place additional requirements on topological manifolds.
A curve is a topological space which is locally homeomorphic to a line.
Continuous and smooth envelopes of topological algebras.
Topological groups are always completely regular as topological spaces.
This has focused attention on topological invariants.
The topological classification of stratified spaces.
Thus we use a category to generalize a topological space.
An irreducible component of a topological space is a maximal irreducible subset.
This construction can be generalized to topological spaces.
Topological groups began to be studied as such.
Static systems and general topological spaces.
Topological graph theory is the study of graph embeddings.
Construction of algebraic structures on compactifications of topological algebras.
Every separable topological space is ccc.
Each consists of a single directional topological link.
Topological maps readily show this.
This algorithm is similar to finding a topological ordering.
A topological charactesization of relatively hyperbolic groups.
In this case graphene becomes a topological insulator.
