Numbers not Sum of Distinct Squares

Theorem
The positive integers which are not the sum of $1$ or more distinct squares are:
 * $2, 3, 6, 7, 8, 11, 12, 15, 18, 19, 22, 23, 24, 27, 28, 31, 32, 33, 43, 44, 47, 48, 60, 67, 72, 76, 92, 96, 108, 112, 128$

Proof
It will be proved that the largest integer which cannot be expressed as the sum of distinct squares is $128$.

The remaining integers in the sequence can be identified by inspection.

We prove this using a variant of Second Principle of Mathematical Induction.

Let $\map P n$ be the proposition:


 * $n$ can be expressed as the sum of distinct squares.

Basis for the induction
We verify the result up to $18^2 = 324$.

Then we conclude all $n$ with $129 \le n \le 324$ can be expressed as the sum of distinct triangular numbers.

So $\map P n$ is true for all $129 \le n \le 324$.

This is the basis for the induction.

Induction Hypothesis
Suppose for some $k > 324$, $\map P j$ is true for all $129 \le j < k$.

That is, every integer between $129$ and $k - 1$ can be expressed as the sum of distinct triangular numbers.

This is the induction hypothesis.

Induction Step
This is the induction step:

We find the largest integer $i$ such that $i^2 < k \le \paren {i + 1}^2$.

We show that $k - \paren {i - 4}^2$ can be expressed as the sum of distinct triangular numbers, and the sum does not involve $\paren {i - 4}^2$.

Then $k$ can be expressed as the sum of distinct triangular numbers.

Since $k > 324 = 18^2$, we must have $i \ge 18$.

Hence $k > k - \paren {i - 4}^2 \ge k - 14^2 > 324 - 196 = 128$.

Thus $k - \paren {i - 4}^2$ can be expressed as the sum of distinct triangular numbers by Induction Hypothesis.

A sufficient condition such that the sum does not involve $\paren {i - 4}^2$ is $\paren {i - 4}^2 > k - \paren {i - 4}^2$.

We have:

Therefore we have $\paren {i - 4}^2 > k - \paren {i - 4}^2$.

Hence $\map P k$ is true.

By the Second Principle of Mathematical Induction, $\map P n$ is true for all $n \ge 128$.

Thus every integer greater than $128$ can be expressed as the sum of distinct square numbers.