Skip to search formSkip to main content
You are currently offline. Some features of the site may not work correctly.

Maximum theorem

Known as: Berge's maximum theorem 
The maximum theorem provides conditions for the continuity of an optimized function and the set of its maximizers as a parameter changes. The… Expand
Wikipedia

Papers overview

Semantic Scholar uses AI to extract papers important to this topic.
2016
2016
Starting from one extension of the Hahn---Banach theorem, the Mazur---Orlicz theorem, and a not very restrictive concept of… Expand
Is this relevant?
2007
2007
In this note, we state a zero-maximum principle for core allocations, a result which was foreseen by Luenberger (1995). We prove… Expand
Is this relevant?
2005
2005
For a finite set of actions and a rich set of fundamentals, consider the rationalizable actions on a universal type space… Expand
Is this relevant?
2005
2005
In this paper, another proof of the Cauchy criterion and the maximum theorem is given directly by using the nested intervals… Expand
Is this relevant?
2004
2004
The Walras core of an economy is the set of allocations that are attainable for the consumers when their trades are constrained… Expand
Is this relevant?
Highly Cited
2001
Highly Cited
2001
The paper considers the use of a Consumer Price Index (CPI) for three possible purposes: (1) as a Cost of Living Index (COLI); i… Expand
Is this relevant?
1998
1998
We give variants on Berge's Maximum Theorem in which the lower and the upper semicontinuities of the preference relation are… Expand
Is this relevant?
1992
1992
An extension of Berge's Maximum Theorem is given, with two different topologies on the choice set used for the two semicontinuity… Expand
Is this relevant?
1990
1990
In this paper we generalize Berge's Maximum Theorem to the case where the payoff (utility) functions and the feasible action… Expand
Is this relevant?
1960
1960
The classical maximum modulus theorem for solutions of second order elliptic equations was recently extended by C. Miranda [4] to… Expand
Is this relevant?