Define

S = {y ∈ C¹[0, π] : у(0) = у(π) = 0}

\(\rm \|f\|_{\infty}=\max _{x \displaystyle \in[0, \pi]}|f(x)|\), for all f ∈ S 

B₀(f, ε) = {f ∈ S : ||f||_∞ < ε}

B1(f, ε) = {f ∈ S : ||f||∞ + ||f'||∞ < ε}

Consider the functional J : S → ℝ given by

J[y] = \(\rm \int_0^\pi(1-\left(y^{\prime})^2\right) y^2 d x\)

Then there exists ε > 0 such that