A follow-up to our PNAS paper on a new theory of steroid-mediated gene induction is now available on PLoS One here. The title and abstract is below. In the first paper, we proposed a general mathematical framework to compute how much protein will be produced from a steroid-mediated gene. It had been noted in the past that the dose response curve of product given steroid amount follows a Michaelis-Menten curve or first order Hill function (e.g. Product = Amax [S]/(EC50+[S], where [S] is the added steroid concentration).. In our previous work, we exploited this fact and showed that a complete closed form expression for the dose response curve could be written down for an arbitrary number of linked reactions. The formula also indicates how added cofactors could increase or decrease the Amax or EC50. What we do in this paper is to show how this expression can be used to predict the mechanism and order in the sequence of reactions a given cofactor will act by analyzing how two cofactors affect the Amax and EC50.
Deducing the Temporal Order of Cofactor Function in Ligand-Regulated Gene Transcription: Theory and Experimental Verification
Edward J. Dougherty, Chunhua Guo, S. Stoney Simons Jr, Carson C. Chow
Abstract: Cofactors are intimately involved in steroid-regulated gene expression. Two critical questions are (1) the steps at which cofactors exert their biological activities and (2) the nature of that activity. Here we show that a new mathematical theory of steroid hormone action can be used to deduce the kinetic properties and reaction sequence position for the functioning of any two cofactors relative to a concentration limiting step (CLS) and to each other. The predictions of the theory, which can be applied using graphical methods similar to those of enzyme kinetics, are validated by obtaining internally consistent data for pair-wise analyses of three cofactors (TIF2, sSMRT, and NCoR) in U2OS cells. The analysis of TIF2 and sSMRT actions on GR-induction of an endogenous gene gave results identical to those with an exogenous reporter. Thus new tools to determine previously unobtainable information about the nature and position of cofactor action in any process displaying first-order Hill plot kinetics are now available.
sets in the power set. Thus, you are one of an exponential number of possible bit combinations for a finite universe and if the universe is infinitely large then you are one of an uncountably infinite number of possible combinations. Hence, in order for the Creator to know you exist she has to a) know which subset corresponds to you and be able to find you and b) know when that subset will appear in the universe. Thanks to the brilliance of 
different ways I could appreciate art. Now, I have no idea if a hundred is correct but suffice it to say that anything above 50 or so makes the number of combinations so large that it will take Moore’s law a long time to catch up and anything above 300 makes it virtually impossible to handle computationally in our universe with a classical computer. Thus, if art appreciation is sufficiently complex, meaning that it involves a few hundred or more neural parameters, then Big Data on the brain alone will not be sufficient to obtain insight into what makes a piece of art special. Some sort of reduced description would be necessary and that already exists in the form of art history. That is not to say that data mining how people respond to art may not provide some statistical information on what would constitute a masterpiece. After all, Netflix is pretty successful in predicting what movies you will like based on what you have liked before and what other people like. However, there will always be room for the art critic.
th toss you get 
dollars. So if heads comes up on the first toss you get one dollar and if it comes up on the fourth you would get 8 dollars. The question is how much would you pay for a ticket to play this game. In economics theory, the idea is that you would play if the expectation value of the payout minus the ticket price is positive. The paradox for this game is that the expectation value of the payout is infinite but most people would pay no more than ten dollars. The solution to the paradox has been debated for the past three centuries. Now, physicist 
, the payout increases exponentially as 
. The product is always 1/2 and never decays. The expectation value is thus![E[S]=\sum_{n=1}^\infty p(n)S(n) = 1/2+1/2 + \cdots](http://s0.wp.com/latex.php?latex=E%5BS%5D%3D%5Csum_%7Bn%3D1%7D%5E%5Cinfty+p%28n%29S%28n%29+%3D+1%2F2%2B1%2F2+%2B+%5Ccdots&bg=ffffff&fg=333333&s=0 "E[S]=\sum_{n=1}^\infty p(n)S(n) = 1/2+1/2 + \cdots")
, so the utility of money decreases with wealth. Given that this now grows sub-exponentially, the expectation value of 
is thus finite and resolves the paradox. People have always puzzled over this solution because it seems ad hoc. Why should my utility function be the same as someone else’s? Menger suggested that he could always come up with an even faster growing payout function to make the expectation value still divergent and declared that all utility functions must be bounded. According to Peters, this has affected the course of economics for the twentieth century and may have led to more risk taking than warranted mathematically.
changes is given by the expression
is the wealth, 
is the cost to play, and 
is the payout at round 
rounds is thus 
. Now transform from rounds of the game played into 
to yield
,
is the probability for 
with 
, where
,
