(M3E6) [Microeconomics] Utility Maximization Problem with Quasi-Linear Utility Functions

Hi Pablo!
The solution of the Lagrangian, i.e., X and Y, always satisfies the budget constraint (i.e., XPx+YPy=I). But that doesn't mean that the Lagrangian solution is always the optimal (demand) solution. We need to consider if X (i.e., X=(I-Px)/Px) is positive. If X is negative, then the Lagrangian solution cannot be the optimal solution, simply because demands are not allowed to be negative. In this case, optimal demand for X should be 0, and so consumer must spend all his money on good Y.
The reason for this is simple: First, because Y enters into utility as lnY, it cannot be zero. Second, the optimal Lagrangian solution suggests that the consumer must spend his money primarily on good Y because the optimal Y is independent of I. Think it this way, if you don't have a place to live (apartment/room), then there is no point of buying more and more furniture. Your optimal Y is, say, a studio apartment. If you have enough budget, then you should rent a studio apartment, and then spend the rest of your income on furniture. However, if your budget isn't enough for a studio apartment, then buying furniture is pointless. You first need to fulfil Y as much as your budget allows (sharing apartment with somebody else may be) and then spend the rest on X (if there is any left).
I see now that providing this explanation would make things a bit better. Sorry for missing this out and thanks for the question.

@@selcukozyurt Thank you for the excellent explanation and for letting everybody access your videos. Best!

Double derivative = 0, to show concavity or convexity

There are implicit boundary conditions here. For certain values of prices and income, the consumer buys 0 units of X and spends all income on Y.