natural numbers object
zingiberaceous
indicable
zygomorphous
zygomorphically
zingiberoid
Bimmeler
sortal
Zwinglianist
zygomorphy
zonated
vanillylacetone
unionite
group
mathematical group
zygodactylism
antisymmetric
combozine
Grothendieck universe
autoboxed
principal ideal
retopology
superimmensity
universal property
scientific classification
Zolaistic
zeta pinch
Bennett pinch
zino
implexion
Ilieff's conjecture
dimension
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multizygotic
group object
medoid
attribute
automorphism
Young symmetrizer
Zhdanovist
xem
commutative algebra
fibre
paradox
algebraic structure
set
anthropomorphous
intensive property
reflexivity
Showu
reflexiveness
zonating
fiber
conicality
amorphia
anabelian geometry
zymogenic
macrography
subobject classifier
zygose
variation
rig
one
object
urelement
emblem
pole
thing
zero divisor
paradoxical
Klein geometry
Jordan algebra
relative pseudo-complement
nominalism
zhuiqin
zinelike
preprimitive
class
jobbie
Zöllner's lines
quism
algebroid
seminormal
quasigroup
Knuth equivalence
generic element
pseudofinite
invariantist
lateral surface
superseparability
topologicality
Dixmier conjecture
zitty
wildcard
valuelessness
cobordism
identity element
zygotic
garnetohedral
holonomic constraint

English words for 'An object which has a distinguished global element (which may be called z, for “zero”) and a distinguished endomorphism (which may be called s, for “successor”) such that iterated compositions of s upon z (i.e., sⁿ∘z) yields other global elements of the same object which correspond to the natural numbers (sⁿ∘z↔n). Such object has the universal property that for any other object with a distinguished global element (call it z’) and a distinguished endomorphism (call it s’), there is a unique morphism (call it φ) from the given object to the other object which maps z to z’ (𝜙∘z=z') and which commutes with s; i.e., 𝜙∘s=s'∘𝜙.'

As you may have noticed, above you will find words for "An object which has a distinguished global element (which may be called z, for “zero”) and a distinguished endomorphism (which may be called s, for “successor”) such that iterated compositions of s upon z (i.e., sⁿ∘z) yields other global elements of the same object which correspond to the natural numbers (sⁿ∘z↔n). Such object has the universal property that for any other object with a distinguished global element (call it z’) and a distinguished endomorphism (call it s’), there is a unique morphism (call it φ) from the given object to the other object which maps z to z’ (𝜙∘z=z') and which commutes with s; i.e., 𝜙∘s=s'∘𝜙.". Hover the mouse over the word you'd like to know more about to view its definition. Click search related words by phrase or description. to find a better fitting word. Finally, thanks to ChatGPT, the overall results have been greatly improved.

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