However F also maps functions to homomorphisms, mapping f to its unique extension as a homomorphism, while U maps homomorphisms to functions, namely the homomorphism itself as a function.    From Wordnik.com.  [Algebra] Reference

Likewise the homomorphism from G to G is an identity function.    From Wordnik.com.  [Algebra] Reference

Then T has a model A with the property that for every model B of T there is a unique homomorphism from.    From Wordnik.com.  [First-order Model Theory] Reference

Each of these functions is from a generator set to an algebra and therefore has a unique extension to a homomorphism.    From Wordnik.com.  [Algebra] Reference

A homomorphism from structure A to structure B is a function f from dom (A) to dom (B) with the property that for every atomic formula.    From Wordnik.com.  [First-order Model Theory] Reference

If it is onto, then the inverse map from dom (B) to dom (A) is also a homomorphism, and both the embedding and its inverse are said to be isomorphisms.    From Wordnik.com.  [First-order Model Theory] Reference

Moreover, this correspondence is functorial: any Boolean homomorphism is sent to a continuous map of topological spaces, and, conversely, any continuous map between the spaces is sent to a Boolean homomorphism.    From Wordnik.com.  [Category Theory] Reference

Reload this page in a moment. is a homomorphism from a finite.    From Wordnik.com.  [Feeds4all documents in category 'SEO'] Reference

If R is a ring with identity, then there is a ring homomorphism.    From Wordnik.com.  [Citizendium, the Citizens' Compendium - Recent changes [en]] Reference

Which means we have our syntactic monoid and canonical homomorphism.    From Wordnik.com.  [Planet Haskell] Reference

A lattice homomorphism is a map between lattices which preserves join and meet.    From Wordnik.com.  [Citizendium, the Citizens' Compendium - Recent changes [en]] Reference

It is necessarily montone, but not every monotone map is a lattice homomorphism.    From Wordnik.com.  [Citizendium, the Citizens' Compendium - Recent changes [en]] Reference

You should end up with a canonical homomorphism that's similar to the one above.    From Wordnik.com.  [Planet Haskell] Reference

Anything satisfying these laws is called a monoid homomorphism, or just homomorphism for short.    From Wordnik.com.  [Planet Haskell] Reference

So we'd like our measurement homomorphism to map all interchangeable strings to the same values.    From Wordnik.com.  [Planet Haskell] Reference

By 'image', I simply mean all the possible values that could arise from applying the homomorphism to all possible strings.    From Wordnik.com.  [Planet Haskell] Reference

Character (group theory): A homomorphism from a group to the unit circle; more generally, the trace of a group representation.    From Wordnik.com.  [Citizendium, the Citizens' Compendium - Recent changes [en]] Reference

Dan Greene: Also, these are pretty stringent conditions on what constitutes a Banach algebra and what constitutes a homomorphism.    From Wordnik.com.  [Feeds4all documents in category 'SEO'] Reference

Ag denote the permutation associated with action by the group element group homomorphism, and every group action arises in this way.    From Wordnik.com.  [Citizendium, the Citizens' Compendium - Recent changes [en]] Reference

To deduce Conjecture 3 from Conjecture 2, we encode the Freiman homomorphism thus f is the vertical Fourier transform of the graph of.    From Wordnik.com.  [What's new] Reference

Dirichlet character: A group homomorphism on the multiplicative group in modular arithmetic extended to a multiplicative function on the positive integers.    From Wordnik.com.  [Citizendium, the Citizens' Compendium - Recent changes [en]] Reference

A homomorphism that strikes this balance perfectly is called the 'canonical homomorphism' and the image of the set of all strings under this homomorphisms is called the syntactic monoid.    From Wordnik.com.  [Planet Haskell] Reference

And was circumspectly pyorrhoea into the box, tuscarora my naprosyn medina into an unhearing commute ferryman, tegucigalpa the mac coreidae and homomorphism in a commutative epicurus to our kaput neurobiological.    From Wordnik.com.  [Rational Review] Reference

19 The transfer homomorphism and the Smith sequences.    From Wordnik.com.  [VeryCD - 电驴资源订阅] Reference

I (x) = log | σi (x) | and is a map from group homomorphism.    From Wordnik.com.  [Citizendium, the Citizens' Compendium - Recent changes [en]] Reference

"privacy homomorphism," or "fully homomorphic encryption," makes possible the deep and unlimited analysis of encrypted information - data that has been intentionally scrambled - without sacrificing confidentiality.    From Wordnik.com.  [doggdot.us] Reference

C-algebra has exactly one homomorphism to every.    From Wordnik.com.  [Algebra] Reference

F ‰: X†’A arises as the restriction to X of its extension to a homomorphism.    From Wordnik.com.  [Algebra] Reference

A Fourier-analytic computation using the Freiman homomorphism property of and some standard applications of the Cauchy-Schwartz inequality shows that, in fact).    From Wordnik.com.  [What's new] Reference

A homomorphism h from.    From Wordnik.com.  [Propositional Consequence Relations and Algebraic Logic] Reference

Now every homomorphism.    From Wordnik.com.  [Algebra] Reference

Group homomorphism dearmeblog: 1.    From Wordnik.com.  [Feeds4all documents in category 'SEO'] Reference

H occurs as the kernel of a homomorphism from.    From Wordnik.com.  [Citizendium, the Citizens' Compendium - Recent changes [en]] Reference

'privacy homomorphism,' or 'fully homomorphic encryption,' makes possible the deep and unlimited analysis of encrypted information - data that has been intentionally scrambled - without sacrificing confidentiality. ".    From Wordnik.com.  [doggdot.us] Reference

19 The transfer homomorphism in homology.    From Wordnik.com.  [VeryCD - 电驴资源订阅] Reference