Quasi-concavity of a function of two variables such as z=(x^a+y^b)^2 with a and b both greater than one... is it enough to show that it is not quasiconcave by showing that the second derivatives are not negative?

frobirrimupyx

frobirrimupyx

Answered question

2022-09-04

Quasi-concavity of a function of two variables such as z = ( x a + y b ) 2 with a and b both greater than one... is it enough to show that it is not quasiconcave by showing that the second derivatives are not negative?

Answer & Explanation

Medwsa1c

Medwsa1c

Beginner2022-09-05Added 17 answers

Step 1
The quasi- part matters. A quasiconcave function need not have negative second derivative. It seems that the definition of quasiconcavity that you are using is
f ( t a + ( 1 t ) b ) min ( f ( a ) , f ( b ) ) , 0 t 1
It is a bit more convenient to work with an equivalent form of the above: for every λ the set { x : f ( x ) λ } is convex (on a line this means that the set is an interval). For example, every increasing function on [ 0 , ) is quasiconcave, and x 2 is an example of that.
Concerning f ( x , y ) = ( x a + y b ) 2 : note that the upper level set { ( x , y ) : f ( x , y ) λ } can be written as { ( x , y ) : x a + y b λ 1 / 2 } . To show this set is not always convex, I would try λ = 1 and the points ( 1 , 0 ) and ( 0 , 1 ) . The midpoint ( 1 2 ,   1 2 ) is not in the upper level set.

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