Non-singular Operator

Question

Let $V$ be the space of polynomial functions over $\mathbb{R}$

Can we give an example of a linear operator $T$ on $V$ such that $T$ is non-singular and non-invertible?

If a linear operator is singular, it's not invertible; and if it's non-sigular, the operator is necessarily invertible, so there's no such example (over any vector space) - see here and here. — matan129, Oct 06 '18 at 16:06

Sourasish Karmakar · Answer 1 · 2022-01-11T11:33:12.530

0

Let $T$ be the transformation on $R[X]$ given by

$$T\left(\sum_{i=0}^n c_i x^{i}\right) = \sum_{i=0}^n \frac{c_i}{1+i}x^{1+i}.$$

Then $T$ is non-singular (because its kernel is $0$) and non-invertible (because $1$ has no pre-image).

N.B.: $R[X]$ is infinite dimensional.

edited Jan 11 '22 at 11:33

answered Aug 04 '21 at 18:04

1 Answers1