In the Chomsky classification of formal languages, I need some examples of `Non-Linear, Unambiguous and also Non-Deterministic`

Context-Free-Language(N-CFL)?

**Linear Language**: For which Linear grammar is possible( ⊆ CFG) e.g.

L_{1}= {a^{n}b^{n}| n ≥ 0 }**Deterministic Context Free Language(D-CFG)**: For which Deterministic Push-Down-Automata(D-PDA) is possible e.g.

L_{2}= {a^{n}b^{n}c^{m}| n ≥ 0, m ≥ 0 }

L_{2}is unambiguous.

A CF grammar that is not linear is nonlinear.

L_{nl}= {w: n_{a}(w) = n_{b}(w)} is also aNon-Linear CFG.

--
3.
**Non-Deterministic Context Free Language(N-CFG)**: For which `only Non-Deterministic Push-Down-Automata(N-PDA)`

is possible e.g.

L_{3} = {ww^{R} | w ∈ {a, b}^{*} }

L_{3} is also Linear CFG.

--4. **Ambiguous CFL**: CFL for which `only ambiguous CFG is possible`

L_{4} = {a^{n}b^{n}c^{m} | n ≥ 0, m ≥ 0 } U {a^{n}b^{m}c^{m} | n ≥ 0, m ≥ 0 }

L_{4} is both non-linear and Ambiguous CFG And Every Ambigous CFL \subseteq N-CFL.

**My Question is:**

Whether all non-linear, Non-Deterministic CFL are Ambiguous? If not then
I need a example that is non-linear, non-deterministic CFL and also unambiguous?

**Given Venn-diagram below:**

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