In idempotent analysis, the tropical semiring is a semiring of extended real numbers with the operations of minimum (or maximum) and addition replacing the usual ("classical") operations of addition and multiplication, respectively. The tropical semiring has various applications (see tropical analysis), and forms the basis of tropical geometry. The name ''tropical'' is a reference to the Hungarian-born computer scientist Imre Simon, so named because he lived and worked in Brazil.

Definition

The ' (or or ) is the semiring (ℝ ∪ , ⊕, ⊗), with the operations: :

x \oplus y = \min\,

x \otimes y = x + y.

The operations ⊕ and ⊗ are referred to as ''tropical addition'' and ''tropical multiplication'' respectively. The unit for ⊕ is +∞, and the unit for ⊗ is 0. Similarly, the ' (or or or ) is the semiring (ℝ ∪ , ⊕, ⊗), with operations: :

x \oplus y = \max\,

x \otimes y = x + y.

The unit for ⊕ is −∞, and the unit for ⊗ is 0. The two semirings are isomorphic under negation

x \mapsto -x

, and generally one of these is chosen and referred to simply as the ''tropical semiring''. Conventions differ between authors and subfields: some use the ''min'' convention, some use the ''max'' convention. Tropical addition is Idempotence, idempotent, thus a tropical semiring is an example of an Semiring#idempotent semiring, idempotent semiring. A tropical semiring is also referred to as a , though this should not be confused with an associative algebra over a tropical semiring. Tropical exponentiation is defined in the usual way as iterated tropical products (see ).

Valued fields

The tropical semiring operations model how valuation (algebra), valuations behave under addition and multiplication in a valued field. A real-valued field ''K'' is a field equipped with a function :

v \colon K \to \mathbb \cup \

which satisfies the following properties for all ''a'', ''b'' in ''K'': :

v(a) = \infty

if and only if

a = 0,

v(ab) = v(a) + v(b) = v(a) \otimes v(b),

v(a + b) \geq \min\ = v(a) \oplus v(b),

with equality if

v(a) \neq v(b).

Therefore the valuation ''v'' is almost a semiring homomorphism from ''K'' to the tropical semiring, except that the homomorphism property can fail when two elements with the same valuation are added together. Some common valued fields: * Q or C with the trivial valuation, ''v''(''a'') = 0 for all ''a'' ≠ 0, * Q or its extensions with the p-adic valuation, ''v''(''p''^''n''''a''/''b'') = ''n'' for ''a'' and ''b'' coprime to ''p'', * the field of formal Laurent series ''K''((''t'')) (integer powers), or the field of Puiseux series ''K'', or the field of Hahn series, with valuation returning the smallest exponent of ''t'' appearing in the series.

References

* {{refend Tropical analysis, Semiring