admissible valuation - meaning and definition. What is admissible valuation
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What (who) is admissible valuation - definition

Valuation domain; Center (valuation ring)

Admissible trading strategy         
In finance, an admissible trading strategy or admissible strategy is any trading strategy with wealth almost surely bounded from below. In particular, an admissible trading strategy precludes unhedged short sales of any unbounded assets.
Admissible heuristic         
HEURISTIC THAT NEVER OVERESTIMATES THE COST OF REACHING THE GOAL, I.E. THE COST IT ESTIMATES TO REACH THE GOAL IS NOT HIGHER THAN THE LOWEST POSSIBLE COST FROM THE CURRENT POINT IN THE PATH
Admissible Heuristic; Optimistic heuristic; Inadmissible heuristic
In computer science, specifically in algorithms related to pathfinding, a heuristic function is said to be admissible if it never overestimates the cost of reaching the goal, i.e.
Business valuation         
PROCESS OF DETERMINING ECONOMIC VALUE OF AN OWNER'S INTEREST
Corporate valuation; Enterprise valuation; Marketability; Discount for lack of marketability; Total Beta
Business valuation is a process and a set of procedures used to estimate the economic value of an owner's interest in a business. Here various valuation techniques are used by financial market participants to determine the price they are willing to pay or receive to effect a sale of the business.

Wikipedia

Valuation ring

In abstract algebra, a valuation ring is an integral domain D such that for every element x of its field of fractions F, at least one of x or x−1 belongs to D.

Given a field F, if D is a subring of F such that either x or x−1 belongs to D for every nonzero x in F, then D is said to be a valuation ring for the field F or a place of F. Since F in this case is indeed the field of fractions of D, a valuation ring for a field is a valuation ring. Another way to characterize the valuation rings of a field F is that valuation rings D of F have F as their field of fractions, and their ideals are totally ordered by inclusion; or equivalently their principal ideals are totally ordered by inclusion. In particular, every valuation ring is a local ring.

The valuation rings of a field are the maximal elements of the set of the local subrings in the field partially ordered by dominance or refinement, where

( A , m A ) {\displaystyle (A,{\mathfrak {m}}_{A})} dominates ( B , m B ) {\displaystyle (B,{\mathfrak {m}}_{B})} if A B {\displaystyle A\supseteq B} and m A B = m B {\displaystyle {\mathfrak {m}}_{A}\cap B={\mathfrak {m}}_{B}} .

Every local ring in a field K is dominated by some valuation ring of K.

An integral domain whose localization at any prime ideal is a valuation ring is called a Prüfer domain.