let X be set ; :: thesis: for S, T being RealNormSpace

for f being PartFunc of S,T st f is_uniformly_continuous_on X holds

f is_continuous_on X

let S, T be RealNormSpace; :: thesis: for f being PartFunc of S,T st f is_uniformly_continuous_on X holds

f is_continuous_on X

let f be PartFunc of S,T; :: thesis: ( f is_uniformly_continuous_on X implies f is_continuous_on X )

assume A1: f is_uniformly_continuous_on X ; :: thesis: f is_continuous_on X

hence f is_continuous_on X by A2, NFCONT_1:19; :: thesis: verum

for f being PartFunc of S,T st f is_uniformly_continuous_on X holds

f is_continuous_on X

let S, T be RealNormSpace; :: thesis: for f being PartFunc of S,T st f is_uniformly_continuous_on X holds

f is_continuous_on X

let f be PartFunc of S,T; :: thesis: ( f is_uniformly_continuous_on X implies f is_continuous_on X )

assume A1: f is_uniformly_continuous_on X ; :: thesis: f is_continuous_on X

A2: now :: thesis: for x0 being Point of S

for r being Real st x0 in X & 0 < r holds

ex s being Real st

( 0 < s & ( for x1 being Point of S st x1 in X & ||.(x1 - x0).|| < s holds

||.((f /. x1) - (f /. x0)).|| < r ) )

X c= dom f
by A1;for r being Real st x0 in X & 0 < r holds

ex s being Real st

( 0 < s & ( for x1 being Point of S st x1 in X & ||.(x1 - x0).|| < s holds

||.((f /. x1) - (f /. x0)).|| < r ) )

let x0 be Point of S; :: thesis: for r being Real st x0 in X & 0 < r holds

ex s being Real st

( 0 < s & ( for x1 being Point of S st x1 in X & ||.(x1 - x0).|| < s holds

||.((f /. x1) - (f /. x0)).|| < r ) )

let r be Real; :: thesis: ( x0 in X & 0 < r implies ex s being Real st

( 0 < s & ( for x1 being Point of S st x1 in X & ||.(x1 - x0).|| < s holds

||.((f /. x1) - (f /. x0)).|| < r ) ) )

assume that

A3: x0 in X and

A4: 0 < r ; :: thesis: ex s being Real st

( 0 < s & ( for x1 being Point of S st x1 in X & ||.(x1 - x0).|| < s holds

||.((f /. x1) - (f /. x0)).|| < r ) )

consider s being Real such that

A5: 0 < s and

A6: for x1, x2 being Point of S st x1 in X & x2 in X & ||.(x1 - x2).|| < s holds

||.((f /. x1) - (f /. x2)).|| < r by A1, A4;

take s = s; :: thesis: ( 0 < s & ( for x1 being Point of S st x1 in X & ||.(x1 - x0).|| < s holds

||.((f /. x1) - (f /. x0)).|| < r ) )

thus 0 < s by A5; :: thesis: for x1 being Point of S st x1 in X & ||.(x1 - x0).|| < s holds

||.((f /. x1) - (f /. x0)).|| < r

let x1 be Point of S; :: thesis: ( x1 in X & ||.(x1 - x0).|| < s implies ||.((f /. x1) - (f /. x0)).|| < r )

assume ( x1 in X & ||.(x1 - x0).|| < s ) ; :: thesis: ||.((f /. x1) - (f /. x0)).|| < r

hence ||.((f /. x1) - (f /. x0)).|| < r by A3, A6; :: thesis: verum

end;ex s being Real st

( 0 < s & ( for x1 being Point of S st x1 in X & ||.(x1 - x0).|| < s holds

||.((f /. x1) - (f /. x0)).|| < r ) )

let r be Real; :: thesis: ( x0 in X & 0 < r implies ex s being Real st

( 0 < s & ( for x1 being Point of S st x1 in X & ||.(x1 - x0).|| < s holds

||.((f /. x1) - (f /. x0)).|| < r ) ) )

assume that

A3: x0 in X and

A4: 0 < r ; :: thesis: ex s being Real st

( 0 < s & ( for x1 being Point of S st x1 in X & ||.(x1 - x0).|| < s holds

||.((f /. x1) - (f /. x0)).|| < r ) )

consider s being Real such that

A5: 0 < s and

A6: for x1, x2 being Point of S st x1 in X & x2 in X & ||.(x1 - x2).|| < s holds

||.((f /. x1) - (f /. x2)).|| < r by A1, A4;

take s = s; :: thesis: ( 0 < s & ( for x1 being Point of S st x1 in X & ||.(x1 - x0).|| < s holds

||.((f /. x1) - (f /. x0)).|| < r ) )

thus 0 < s by A5; :: thesis: for x1 being Point of S st x1 in X & ||.(x1 - x0).|| < s holds

||.((f /. x1) - (f /. x0)).|| < r

let x1 be Point of S; :: thesis: ( x1 in X & ||.(x1 - x0).|| < s implies ||.((f /. x1) - (f /. x0)).|| < r )

assume ( x1 in X & ||.(x1 - x0).|| < s ) ; :: thesis: ||.((f /. x1) - (f /. x0)).|| < r

hence ||.((f /. x1) - (f /. x0)).|| < r by A3, A6; :: thesis: verum

hence f is_continuous_on X by A2, NFCONT_1:19; :: thesis: verum