kinematic constraint - significado y definición. Qué es kinematic constraint
Diclib.com
Diccionario ChatGPT
Ingrese una palabra o frase en cualquier idioma 👆
Idioma:

Traducción y análisis de palabras por inteligencia artificial ChatGPT

En esta página puede obtener un análisis detallado de una palabra o frase, producido utilizando la mejor tecnología de inteligencia artificial hasta la fecha:

  • cómo se usa la palabra
  • frecuencia de uso
  • se utiliza con más frecuencia en el habla oral o escrita
  • opciones de traducción
  • ejemplos de uso (varias frases con traducción)
  • etimología

Qué (quién) es kinematic constraint - definición

PROGRAMMING PARADIGM WHICH COMBINES LOGIC PROGRAMMING AND CONSTRAINT SATISFACTION
Constraint Logic Programmimg; Constraint store; Constraint-logic programming; Finite constraint; Finite domain constraint; Constraint Logic Programming; CLP(FD)

Constraint (computational chemistry)         
  • Resolving the constraints of a rigid water molecule using [[Lagrange multipliers]]: a) the unconstrained positions are obtained after a simulation time-step, b) the [[gradients]] of each constraint over each particle are computed and c) the Lagrange multipliers are computed for each gradient such that the constraints are satisfied.
METHOD FOR SATISFYING THE NEWTONIAN MOTION OF A RIGID BODY WHICH CONSISTS OF MASS POINTS
SHAKE (constraint); SETTLE (constraint); LINCS (constraint); Constraint algorithm (mechanics); SHAKE algorithm; Simple constraint; M-SHAKE; SETTLE (algorithm); SETTLE; Constraint algorithm
In computational chemistry, a constraint algorithm is a method for satisfying the Newtonian motion of a rigid body which consists of mass points. A restraint algorithm is used to ensure that the distance between mass points is maintained.
Geometric constraint solving         
CONSTRAINT SATISFACTION IN A COMPUTATIONAL GEOMETRY SETTING
Draft:Geometric constraint solving
Geometric constraint solving is constraint satisfaction in a computational geometry setting, which has primary applications in computer aided design. A problem to be solved consists of a given set of geometric elements and a description of geometric constraints between the elements, which could be non-parametric (tangency, horizontality, coaxiality, etc) or parametric (like distance, angle, radius).
Budget constraint         
  • Budget constraint, where <math>A=\frac{m}{P_y}</math> and <math>B=\frac{m}{P_x}</math>
  • An individual should consume at (Qx, Qy).
  • Point X is unobtainable given the current "budget" constraints on production.
THE COMBINATIONS OF GOODS AND SERVICES THAT A CONSUMER MAY PURCHASE GIVEN CURRENT PRICES WITHIN THEIR GIVEN INCOME
Budget line; Resource constraint; Individual budget constraint; Budget Constraint; Soft budget constraint
In economics, a budget constraint represents all the combinations of goods and services that a consumer may purchase given current prices within his or her given income. Consumer theory uses the concepts of a budget constraint and a preference map as tools to examine the parameters of consumer choices .

Wikipedia

Constraint logic programming

Constraint logic programming is a form of constraint programming, in which logic programming is extended to include concepts from constraint satisfaction. A constraint logic program is a logic program that contains constraints in the body of clauses. An example of a clause including a constraint is A(X,Y) :- X+Y>0, B(X), C(Y). In this clause, X+Y>0 is a constraint; A(X,Y), B(X), and C(Y) are literals as in regular logic programming. This clause states one condition under which the statement A(X,Y) holds: X+Y is greater than zero and both B(X) and C(Y) are true.

As in regular logic programming, programs are queried about the provability of a goal, which may contain constraints in addition to literals. A proof for a goal is composed of clauses whose bodies are satisfiable constraints and literals that can in turn be proved using other clauses. Execution is performed by an interpreter, which starts from the goal and recursively scans the clauses trying to prove the goal. Constraints encountered during this scan are placed in a set called constraint store. If this set is found out to be unsatisfiable, the interpreter backtracks, trying to use other clauses for proving the goal. In practice, satisfiability of the constraint store may be checked using an incomplete algorithm, which does not always detect inconsistency.