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The AGIL paradigm is a sociological scheme created by American sociologist Talcott Parsons in the 1950s. It is a systematic depiction of certain societal functions, which every society must meet to be able to maintain stable social life. [1]
In economics, non-convexity refers to violations of the convexity assumptions of elementary economics.Basic economics textbooks concentrate on consumers with convex preferences (that do not prefer extremes to in-between values) and convex budget sets and on producers with convex production sets; for convex models, the predicted economic behavior is well understood.
Non-monetary (state) communist currents, ranging from libertarian proposals [31] to the harsh reality of Democratic Kampuchea. Many communists and socialists envisaged a moneyless society. [32] Gift economies: other than the word suggests, the gift in such economies usually comes with an obligation to do something in return.
Dan Wetzel. January 14, 2025 at 1:44 PM. After virtually every Dallas Cowboys game, Jerry Jones, the team’s owner, general manager and center-of-attention, arrives in the hallway outside the ...
A non-performing loan (NPL) is a bank loan that is subject to late repayment or is unlikely to be repaid by the borrower in full. Non-performing loans represent a major challenge for the banking sector, as they reduce profitability. [ 1 ]
A graph with three components. In graph theory, a component of an undirected graph is a connected subgraph that is not part of any larger connected subgraph. The components of any graph partition its vertices into disjoint sets, and are the induced subgraphs of those sets.
A non-monotonic logic is a formal logic whose entailment relation is not monotonic. In other words, non-monotonic logics are devised to capture and represent defeasible inferences , i.e., a kind of inference in which reasoners draw tentative conclusions, enabling reasoners to retract their conclusion(s) based on further evidence. [ 1 ]
The existence of smooth but non-analytic functions represents one of the main differences between differential geometry and analytic geometry. In terms of sheaf theory , this difference can be stated as follows: the sheaf of differentiable functions on a differentiable manifold is fine , in contrast with the analytic case.