for f being PartFunc of [:[:RNS_Real,RNS_Real:],RNS_Real:],RNS_Real
for g being PartFunc of [:[:REAL,REAL:],REAL:],REAL
for E being set st f = g & E c= dom f holds
( f is_uniformly_continuous_on E iff for e being Real st 0 < e holds
ex r being Real st
( 0 < r & ( for x1, x2, y1, y2, z1, z2 being Real st [x1,y1,z1] in E & [x2,y2,z2] in E & |.(x2 - x1).| < r & |.(y2 - y1).| < r & |.(z2 - z1).| < r holds
|.((g . [x2,y2,z2]) - (g . [x1,y1,z1])).| < e ) ) )