# set terminal canvas  rounded size 600,400 enhanced fsize 10 lw 1.6 fontscale 1 name "bivariat_8" jsdir "."
# set output 'bivariat.8.js'
set bar 1.000000 front
set style circle radius graph 0.02, first 0.00000, 0.00000 
set style ellipse size graph 0.05, 0.03, first 0.00000 angle 0 units xy
set key inside right bottom vertical Right noreverse enhanced autotitle nobox
set style textbox transparent margins  1.0,  1.0 border
unset logscale
set samples 500, 500
set style data lines
unset paxis 1 tics
unset paxis 2 tics
unset paxis 3 tics
unset paxis 4 tics
unset paxis 5 tics
unset paxis 6 tics
unset paxis 7 tics
set title "Finite summation of 10, 100, 1000 fourier coefficients" 
set xrange [ -10.0000 : 10.0000 ] noreverse nowriteback
set yrange [ -0.400000 : 1.20000 ] noreverse nowriteback
set paxis 1 range [ * : * ] noreverse nowriteback
set paxis 2 range [ * : * ] noreverse nowriteback
set paxis 3 range [ * : * ] noreverse nowriteback
set paxis 4 range [ * : * ] noreverse nowriteback
set paxis 5 range [ * : * ] noreverse nowriteback
set paxis 6 range [ * : * ] noreverse nowriteback
set paxis 7 range [ * : * ] noreverse nowriteback
set colorbox vertical origin screen 0.9, 0.2, 0 size screen 0.05, 0.6, 0 front  noinvert bdefault
integral_f(x) = (x>0)?int1a(x,x/ceil(x/delta)):-int1b(x,-x/ceil(-x/delta))
int1a(x,d) = (x<=d*.1) ? 0 : (int1a(x-d,d)+(f(x-d)+4*f(x-d*.5)+f(x))*d/6.)
int1b(x,d) = (x>=-d*.1) ? 0 : (int1b(x+d,d)+(f(x+d)+4*f(x+d*.5)+f(x))*d/6.)
f(x)=sin(x-1)-.75*sin(2*x-1)+(x**2)/8-5
integral2_f(x,y) = (x<y)?int2(x,y,(y-x)/ceil((y-x)/delta)):                         -int2(y,x,(x-y)/ceil((x-y)/delta))
int2(x,y,d) = (x>y-d*.5) ? 0 : (int2(x+d,y,d) + (f(x)+4*f(x+d*.5)+f(x+d))*d/6.)
ack(m,n) = (m == 0) ? n + 1 : (n == 0) ? ack(m-1,1) : ack(m-1,ack(m,n-1))
min(x,y) = (x < y) ? x : y
max(x,y) = (x > y) ? x : y
gcd(x,y) = gcd1(rnd(max(x,y)),rnd(min(x,y)))
rnd(x) = int(x+0.5)
gcd1(x,y) = (y == 0) ? x : gcd1(y, x - x/y * y)
fourier(k, x) = sin(3./2*k)/k * 2./3*cos(k*x)
sum10(x)   = 1./2 + sum [k=1:10]   fourier(k, x)
sum100(x)  = 1./2 + sum [k=1:100]  fourier(k, x)
sum1000(x) = 1./2 + sum [k=1:1000] fourier(k, x)
delta = 0.2
GPFUN_integral_f = "integral_f(x) = (x>0)?int1a(x,x/ceil(x/delta)):-int1b(x,-x/ceil(-x/delta))"
GPFUN_int1a = "int1a(x,d) = (x<=d*.1) ? 0 : (int1a(x-d,d)+(f(x-d)+4*f(x-d*.5)+f(x))*d/6.)"
GPFUN_int1b = "int1b(x,d) = (x>=-d*.1) ? 0 : (int1b(x+d,d)+(f(x+d)+4*f(x+d*.5)+f(x))*d/6.)"
GPFUN_integral2_f = "integral2_f(x,y) = (x<y)?int2(x,y,(y-x)/ceil((y-x)/delta)):                         -int2(y,x,(x-y)/ceil((x-y)/delta))"
GPFUN_int2 = "int2(x,y,d) = (x>y-d*.5) ? 0 : (int2(x+d,y,d) + (f(x)+4*f(x+d*.5)+f(x+d))*d/6.)"
GPFUN_f = "f(x)=sin(x-1)-.75*sin(2*x-1)+(x**2)/8-5"
GPFUN_ack = "ack(m,n) = (m == 0) ? n + 1 : (n == 0) ? ack(m-1,1) : ack(m-1,ack(m,n-1))"
GPFUN_min = "min(x,y) = (x < y) ? x : y"
GPFUN_max = "max(x,y) = (x > y) ? x : y"
GPFUN_gcd = "gcd(x,y) = gcd1(rnd(max(x,y)),rnd(min(x,y)))"
GPFUN_gcd1 = "gcd1(x,y) = (y == 0) ? x : gcd1(y, x - x/y * y)"
GPFUN_rnd = "rnd(x) = int(x+0.5)"
GPFUN_fourier = "fourier(k, x) = sin(3./2*k)/k * 2./3*cos(k*x)"
k = 1000
GPFUN_sum10 = "sum10(x)   = 1./2 + sum [k=1:10]   fourier(k, x)"
GPFUN_sum100 = "sum100(x)  = 1./2 + sum [k=1:100]  fourier(k, x)"
GPFUN_sum1000 = "sum1000(x) = 1./2 + sum [k=1:1000] fourier(k, x)"
plot     sum10(x)   title "1./2 + sum [k=1:10]   sin(3./2*k)/k * 2./3*cos(k*x)",     sum100(x)  title "1./2 + sum [k=1:100]  sin(3./2*k)/k * 2./3*cos(k*x)",     sum1000(x) title "1./2 + sum [k=1:1000] sin(3./2*k)/k * 2./3*cos(k*x)"