well-defined
1Well-defined — In mathematics, the term well defined is used to specify that a certain concept or object (a function, a property, a relation, etc.) is defined in a mathematical or logical way using a set of base axioms in an entirely unambiguous way and… …
2well-defined — adjective Date: 1704 1. having clearly distinguishable limits, boundaries, or features < a well defined scar > 2. clearly stated or described < well defined policies > …
3well-defined — /wel di fuynd /, adj. sharply or clearly stated, outlined, described, etc.: a well defined character; a well defined boundary. [1695 1705] * * * …
4Defined process — There are two schools of thought about what a defined process is. Contents 1 School of thought 1 2 School of thought 2 3 References 4 Books …
5Defined and undefined — In mathematics, defined and undefined are used to explain whether or not expressions have meaningful, sensible, and unambiguous values. Not all branches of mathematics come to the same conclusion.Examples and workaroundsThe following expressions… …
6Defined — Define De*fine , v. t. [imp. & p. p. {Defined}; p. pr. & vb. n. {Defining}.] [OE. definer, usually, to end, to finish, F. d[ e]finir to define, L. definire to limit, define; de + finire to limit, end, finis boundary, limit, end. See {Final},… …
7Well logging — Gamma ray logging Spontaneous potential logging Resistivity logging Density logging Sonic logging Caliper logging Mud logging LWD/MWD v · …
8Well integrity — is defined by [http://www.standard.no/imaker.exe?id=5738 NORSOK D 010] as “Application of technical, operational and organizational solutions to reduce risk of uncontrolled release of formation fluids throughout the life cycle of a well”. There… …
9Well-known text — (WKT) is a text markup language for representing vector geometry objects on a map, spatial reference systems of spatial objects and transformations between spatial reference systems. A binary equivalent, known as well known binary (WKB) is used… …
10Well-founded relation — In mathematics, a binary relation, R, is well founded (or wellfounded) on a class X if and only if every non empty subset of X has a minimal element with respect to R; that is, for every non empty subset S of X, there is an element m of S such… …
