Seria Fourier trigonometrice
f(t)=f(-t) =>
; bk=0
f(t+T/2)=f(t)
=> a2n-1=b2n-1=0
Transf Hilbert
sML(t)=A(t)cos[w0t+Ф(t)];
SML(w)=1/2H(w)[G(w-w0)+G(w+w0)]
;
sBLD-PS(t)=g(t)cos(w0t)
;
SBLD-PS(w)=1/2[G(w-w0)+G(w+w0)]
sMA(t)=gc[1+mf(t)]cos(w0t);
BMA=2fmM
SMA(w)=πgc[δ(w-w0)+δ(w+w0)\+mgc/2[F(w-w0)+F(w+w0)]
sBLU(t)=1/2g(t)cos(w0t)±1/2ĝ(t)sin(w0t)
SBLU(w)=1/4G(w-w0)[1+sgn(w-w0)]+
1/4G(w+w0)[1-sgn(w+w0)]
sRBL(t)=1/2g(t)cos(w0t)±1/2gq(t)sin(w0t)
;
wi(t)=dΦ(t)/dt=w0+Δwf(t)
MF(t)=U0ejφv(t)=U0ejβsin(wmt)
; sau
;
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