let z be Complex; :: thesis: for CNS being ComplexNormSpace
for RNS being RealNormSpace
for X being set
for f being PartFunc of RNS,CNS st f is_Lipschitzian_on X holds
z (#) f is_Lipschitzian_on X
let CNS be ComplexNormSpace; :: thesis: for RNS being RealNormSpace
for X being set
for f being PartFunc of RNS,CNS st f is_Lipschitzian_on X holds
z (#) f is_Lipschitzian_on X
let RNS be RealNormSpace; :: thesis: for X being set
for f being PartFunc of RNS,CNS st f is_Lipschitzian_on X holds
z (#) f is_Lipschitzian_on X
let X be set ; :: thesis: for f being PartFunc of RNS,CNS st f is_Lipschitzian_on X holds
z (#) f is_Lipschitzian_on X
let f be PartFunc of RNS,CNS; :: thesis: ( f is_Lipschitzian_on X implies z (#) f is_Lipschitzian_on X )
assume A1: f is_Lipschitzian_on X ; :: thesis: z (#) f is_Lipschitzian_on X
then X c= dom f by Def29;
hence A2: X c= dom (z (#) f) by VFUNCT_2:def 4; :: according to NCFCONT1:def 29 :: thesis: ex r being Real st
( 0 < r & ( for x1, x2 being Point of RNS st x1 in X & x2 in X holds
||.(((z (#) f) /. x1) - ((z (#) f) /. x2)).|| <= r * ||.(x1 - x2).|| ) )
consider s being Real such that
A3: ( 0 < s & ( for x1, x2 being Point of RNS st x1 in X & x2 in X holds
||.((f /. x1) - (f /. x2)).|| <= s * ||.(x1 - x2).|| ) ) by A1, Def29;
hence ex r being Real st
( 0 < r & ( for x1, x2 being Point of RNS st x1 in X & x2 in X holds
||.(((z (#) f) /. x1) - ((z (#) f) /. x2)).|| <= r * ||.(x1 - x2).|| ) ) ; :: thesis: verum