The Lebesgue Stieltjes Power Integral 
n(t) - [eos + ¥(W)VGE(H) (7.1) 
fo) 
where E(H) = O vole (s S10 (7.2) 
and E(w) = E42) if Of, <K2 (5) 
and E(uz)< M for all pw (7.4) 
which implies that 
lim E(u) = Emax (7.5) 
uso 
consider a one dimensional net given by 
O <M) <H2 <h3 << hk <Hktl<HRe <*> * <00 (7.6) 
then 
m(t) = lim > (Hone 2) ~E(Hon) “COS (Hontit +¥ Hon.) (7.7) 
max(Uy, 4.) —U,)->O p= 
H-2R--@ 
where O£=V(y,.,,) = 2m (7.8) 
Partial Sum 
n(t) = > ional E(Hon) © COS(Mo ng) t+ V(Hone))) (7.9) 
n=O 
MIN (Hg Pu) = Ap 
MOX(Hy+) —Hk)= Aa# 
fie ci 
a5 Pg «ig 
PE. = Lim Satoh ‘ tim 3 [EtHonea)-EHan)| [SP] 
cia A,p->0 
Ptul PA 2 > [-Etwen)+ E(uan+a)] 
A2n+0 
eres rag (-O+ E(u2))+(- E(H#2)+E(H4))+---- (-E (Hp) +E (Hor 2))| 
Zz 
PG ; 
pre E(Hor42) = ae Emax (7.10) 
Agno 
Plate XW 
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