let D be set ; for f being PartFunc of (REAL 3),REAL st f is_partial_differentiable`2_on D holds
( D c= dom f & ( for u being Element of REAL 3 st u in D holds
f is_partial_differentiable_in u,2 ) )
let f be PartFunc of (REAL 3),REAL ; ( f is_partial_differentiable`2_on D implies ( D c= dom f & ( for u being Element of REAL 3 st u in D holds
f is_partial_differentiable_in u,2 ) ) )
assume A1:
f is_partial_differentiable`2_on D
; ( D c= dom f & ( for u being Element of REAL 3 st u in D holds
f is_partial_differentiable_in u,2 ) )
hence
D c= dom f
by Def17; for u being Element of REAL 3 st u in D holds
f is_partial_differentiable_in u,2
set g = f | D;
let u0 be Element of REAL 3; ( u0 in D implies f is_partial_differentiable_in u0,2 )
assume
u0 in D
; f is_partial_differentiable_in u0,2
then
f | D is_partial_differentiable_in u0,2
by A1, Def17;
then consider x0, y0, z0 being Real such that
A3:
( u0 = <*x0,y0,z0*> & ex N being Neighbourhood of y0 st
( N c= dom (SVF1 2,(f | D),u0) & ex L being LINEAR ex R being REST st
for y being Real st y in N holds
((SVF1 2,(f | D),u0) . y) - ((SVF1 2,(f | D),u0) . y0) = (L . (y - y0)) + (R . (y - y0)) ) )
by BXXLXSDef11;
consider N being Neighbourhood of y0 such that
A4:
( N c= dom (SVF1 2,(f | D),u0) & ex L being LINEAR ex R being REST st
for y being Real st y in N holds
((SVF1 2,(f | D),u0) . y) - ((SVF1 2,(f | D),u0) . y0) = (L . (y - y0)) + (R . (y - y0)) )
by A3;
for y being Real st y in dom (SVF1 2,(f | D),u0) holds
y in dom (SVF1 2,f,u0)
proof
let y be
Real;
( y in dom (SVF1 2,(f | D),u0) implies y in dom (SVF1 2,f,u0) )
assume
y in dom (SVF1 2,(f | D),u0)
;
y in dom (SVF1 2,f,u0)
then A7:
(
y in dom (reproj 2,u0) &
(reproj 2,u0) . y in dom (f | D) )
by FUNCT_1:21;
dom (f | D) = (dom f) /\ D
by RELAT_1:90;
then
dom (f | D) c= dom f
by XBOOLE_1:17;
hence
y in dom (SVF1 2,f,u0)
by A7, FUNCT_1:21;
verum
end;
then
for y being set st y in dom (SVF1 2,(f | D),u0) holds
y in dom (SVF1 2,f,u0)
;
then
dom (SVF1 2,(f | D),u0) c= dom (SVF1 2,f,u0)
by TARSKI:def 3;
then A8:
N c= dom (SVF1 2,f,u0)
by A4, XBOOLE_1:1;
consider L being LINEAR, R being REST such that
A9:
for y being Real st y in N holds
((SVF1 2,(f | D),u0) . y) - ((SVF1 2,(f | D),u0) . y0) = (L . (y - y0)) + (R . (y - y0))
by A4;
for y being Real st y in N holds
((SVF1 2,f,u0) . y) - ((SVF1 2,f,u0) . y0) = (L . (y - y0)) + (R . (y - y0))
proof
let y be
Real;
( y in N implies ((SVF1 2,f,u0) . y) - ((SVF1 2,f,u0) . y0) = (L . (y - y0)) + (R . (y - y0)) )
assume A10:
y in N
;
((SVF1 2,f,u0) . y) - ((SVF1 2,f,u0) . y0) = (L . (y - y0)) + (R . (y - y0))
A12:
for
y being
Real st
y in dom (SVF1 2,(f | D),u0) holds
(SVF1 2,(f | D),u0) . y = (SVF1 2,f,u0) . y
proof
let y be
Real;
( y in dom (SVF1 2,(f | D),u0) implies (SVF1 2,(f | D),u0) . y = (SVF1 2,f,u0) . y )
assume A13:
y in dom (SVF1 2,(f | D),u0)
;
(SVF1 2,(f | D),u0) . y = (SVF1 2,f,u0) . y
then A14:
(
y in dom (reproj 2,u0) &
(reproj 2,u0) . y in dom (f | D) )
by FUNCT_1:21;
(SVF1 2,(f | D),u0) . y =
(f | D) . ((reproj 2,u0) . y)
by A13, FUNCT_1:22
.=
f . ((reproj 2,u0) . y)
by A14, FUNCT_1:70
.=
(SVF1 2,f,u0) . y
by A14, FUNCT_1:23
;
hence
(SVF1 2,(f | D),u0) . y = (SVF1 2,f,u0) . y
;
verum
end;
A16:
y0 in N
by RCOMP_1:37;
(L . (y - y0)) + (R . (y - y0)) =
((SVF1 2,(f | D),u0) . y) - ((SVF1 2,(f | D),u0) . y0)
by A9, A10
.=
((SVF1 2,f,u0) . y) - ((SVF1 2,(f | D),u0) . y0)
by A4, A10, A12
.=
((SVF1 2,f,u0) . y) - ((SVF1 2,f,u0) . y0)
by A4, A12, A16
;
hence
((SVF1 2,f,u0) . y) - ((SVF1 2,f,u0) . y0) = (L . (y - y0)) + (R . (y - y0))
;
verum
end;
hence
f is_partial_differentiable_in u0,2
by A3, A8, BXXLXSDef11; verum