We assume that f(x)\ge M. Since f is decreasing then f(k)\ge f(x), for all x\in [k,k+1], and hence f(k)=f(k)\int_k^{k+1}1\,dx=\int_k^{k+1}f(k)\,dx\ge \int_{k}^{k+1} f(x)\,dx, and hence ...

Let f(x)=k\in W and g\in W^{\perp} then \langle f,g\rangle = k\int_{0}^{1} g(x) dx=0 that is a_0+\frac12a_1+\frac13a_2+\frac14a_3+\frac15a_4=0 then g(x)=a_1(x-1/2)+a_2(x^2-1/3)+a_3(x^3-1/4)+a_4(x^4-1/5) ...

The functional is J[f]=\int_0^1 L(x,f(x),f'(x))\,dx=\int_0^1 xf(x)f'(x)\,dx The Euler-Lagrange equation for this functional, with L=xff' is given by \begin{align} \frac{\partial }{\partial f}L(x,f,f')-\frac{d}{dx}\frac{\partial}{\partial f'}L(x,f,f')&=\frac{\partial }{\partial f}(xff')-\frac{d}{dx}\frac{\partial}{\partial f'}(xff')\\\\ &=xf'-\frac{d}{dx}(xf)\\\\ &=-f \end{align} ...

I post an answer of myself here. Denote Y=H\cdot X, and the characteristics of Y by (B'',C'',\nu''). If we want to find out the characteristics of Y, we'd better make an assumption for the ...

This is going to be essentially the same in content as Jerry Schirmer's response, but I thought you might like to hear it in more mathematical terms. The velocity function v is defined as v(t) = \dot{ x}(t) ...

For fixed u\in H^1_0: If v\in H^1_0 has norm one, then |v(x)|\leq 1 for all x so the sup over such v's is bounded by \frac{1}{\|u\|_H} \int_0^1 |u'| dx This can be made arbitrarily ...