adjective not cyclic; not forming a closed loop or circuit
In mathematics, an acyclic relation is a relation that contains no directed cycles.
In engineering, acyclic systems are systems that do not exhibit cyclic behavior.
In computer science, acyclic graphs are graphs that do not contain any cycles or closed loops.
In organic chemistry, acyclic compounds are compounds that do not contain a cyclic (ring) structure.
In biology, acyclic pathways refer to metabolic pathways that do not form closed loops.
In the field of chemistry, acyclic compounds are often mentioned in discussions about organic chemistry and the structure of molecules.
Psychologists may use the term acyclic when discussing certain patterns or behaviors that do not follow a cyclical or repetitive nature.
Biologists may refer to acyclic pathways in biochemical reactions or metabolic processes within living organisms.
In computer science, acyclic graphs are commonly used in algorithms and data structures to represent relationships without cycles or loops.
Mathematicians may encounter acyclic graphs in the study of graph theory and network analysis.