Examples of 'symmetries' in a sentence
Meaning of "symmetries"
Symmetry is a noun that refers to the quality of being made up of exactly similar parts facing each other or arranged around an axis in a balanced or harmonious way, such as in geometric shapes or designs
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- plural of symmetry
How to use "symmetries" in a sentence
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symmetries
Symmetries of nature are particularly important in subatomic physics.
Representations and symmetries in algebra and topology.
Symmetries may be broadly classified as global or local.
So both of these objects have six symmetries.
Spacetime symmetries are distinguished from internal symmetries.
Wallpaper groups categorize patterns by their symmetries.
Notes on the symmetries of systems of differential equations.
Cells can be shown in two different symmetries.
Symmetries are the holy grail for physicists.
They are respectively of odd and even symmetries.
The symmetries equate to the laws of conservation.
It breaks one of the fundamental symmetries of space.
The symmetries of each pattern are marked in red.
This particular group consists of eight symmetries.
Continuous symmetries are closely linked to the conservation of.
See also
Concept of the set of all symmetries of an object.
Symmetries and conservation laws go hand in hand.
This is one of the great symmetries of nature.
Symmetries are their basic orientation points.
Structure of simplectic grupoids in symmetries and dualities.
Broken symmetries and the masses of gauge bosons.
Duality preserves the symmetries of a polyhedron.
Gauge symmetries possess the following two peculiarities.
An important subclass of continuous symmetries in physics are spacetime symmetries.
These symmetries contain an element known as time reversal.
And count how many symmetries there are.
Symmetries here refer to symmetries in payoffs.
There are other symmetries among the letters too.
Symmetries play a fundamental role in physics.
These eight symmetries form a group.
Symmetries of the standart model and its extensions.
It will posit neither symmetries nor conservation laws.
Symmetries and degeneracies of spin chains.
As another example consider the group of symmetries of a square.
These two gauge symmetries are in fact intimately related.
A conserved quantity is usually associated with such symmetries.
A set of asymmetries and symmetries for an architectural rhythm.
They are continuous but break no symmetries.
Other grating symmetries produce other rotational angles.
It can be viewed as the group of symmetries of the integers.
Different symmetries form different groups with different geometries.
There are many other kinds of symmetries.
They are able to recognize symmetries and to benefit from them.
These computational problems can be characterized by their symmetries.
This property implies that symmetries of the system.
Physicists are then looking for exceptions in the symmetries.
Describe the group of symmetries of a cube.
It is startling because it embodies the mystery of perfect symmetries.
They are symmetries of the sphere.
Additional restrictions on its possible groups of symmetries are known.
