bessl2u.m

主要阐述的是使用差分法解一类Bessel方程在不同边界条件下的离散解

 clear;
Q=1,a=2,u=[30,15,1],R=6;
b=1-a;
for i=1:3
    w=sqrt(u(i));
    A=Q/(a*besseli(0,w)+a*besselk(0,w)*(besseli(1,w*R)/besselk(1,w*R))+b*w*besseli(1,w)-b*w*besselk(1,w)*(besseli(1,w*R)/besselk(1,w*R)));
    B=Q/(a*besseli(0,w)*(besselk(1,w*R)/besseli(1,w*R))+a*besselk(0,w)+b*w*besseli(1,w)*(besselk(1,w*R)/besseli(1,w*R))-b*w*besselk(1,w));
    x=-6:0.1:6;
    y=A*besseli(0,w*x)+B*besselk(0,w*x);
   switch i
        case 1,
            plot(x,y,'k');
        case 2,
            plot(x,y,' . k');
        case 3,
            plot(x,y,' -- k');
        end;
        hold on;
    end;
    hold off;
    axis([-6 6 -0.5 1]);
    legend('u= 30','u= 15','u= 1',0)
    title('第二种边界条件下不同u值的图象','FontSize',12,'FontName','隶书');