| Abstract: | We study the questions of existence and smoothness of demand functions with an infinite number of commodities. The main result obtained, under some hypothesis, is: if a C1 demand exists in a commodity space B, then B can be given an inner product structure. For example, if B is Lp, 1p∞, and if there exists a C1 demand function defined on B then p must be 2. Another result is: if a demand function exists, defined for all prices p and income, then the commodity space must be reflexive. For example, if B is Lp and a demand function exists on B, defined for all prices and incomes then 1<p<∞. We also study the cases L∞ and L1 with weaker assumptions. We finish the paper proving that the demand function is always defined for a dense set of prices and convenient incomes. |
