User:Stimulieconomy

''Welcome to my page! I am old to Wikiversity, and I am very interested in sharing my ideas with the community. Here I present my original research, which I will update sporadically if I remember. The focus of my research is in the social sciences.'' This page was last updated by Stimulieconomy (discuss • contribs) 23:00, 25 April 2013 (UTC)

The law of behavior refers to a quantitative measurement of behavior in society that has its practical applications in sociology, psychology, and economics. When calculating behavior in its quantitative state, the following formula is used:


 * $$(B)=({\Delta C})(S)$$
 * where
 * $$(B)$$ represents behavior
 * $$({\Delta C})$$ represents change in commodities [Δ(L+O)]
 * $$(S)$$ represents stimulus Avg.[Variance(Input) + Variance(Output)]

The "law of commodity" refers to the quantitative measurement of commodities in society that has its practical applications in sociology, psychology, and economics. The following formula is used:
 * $$(C)=(L)+(O)$$
 * where
 * $$(C)$$ represents commodities
 * $$(L)$$ represents labor
 * $$(O)$$ represents output

Let a > b which denotes two separate individual: person "a" with greater status than person "b". The definition of status is relativistic, and different emphases may be placed on social capital versus resource-capital measurements. In the example below, I use income distribution.

If: the income distribution of a + b > 0 from one year to the next, then the partitioning of resources for that year is a non-zero-sum game with gains, distributed unequally with "a" taking more of the gain in the long-run.

If: the income distribution of a + b = 0 from one year to the next, then the partitioning of resources for that year is a zero-sum game, with "a" and "b" sharing the gains and losses proportionally in the long-run.

If: the income distribution of a + b < 0 from one year to the next, then the partitioning of resources for that year is a non-zero-sum game with losses, distributed unequally with "a" absorbing more of the loss in the long-run.