let x0, y0, r be Real; :: thesis: for z being Element of REAL 2
for f being PartFunc of REAL 2, REAL st z = <*x0,y0*> & f is_partial_differentiable`2_in z holds
( r = partdiff2 f,z iff ex x0, y0 being Real st
( z = <*x0,y0*> & ex N being Neighbourhood of y0 st
( N c= dom (SVF2 f,z) & ex L being LINEAR ex R being REST st
( r = L . 1 & ( for y being Real st y in N holds
((SVF2 f,z) . y) - ((SVF2 f,z) . y0) = (L . (y - y0)) + (R . (y - y0)) ) ) ) ) )
let z be Element of REAL 2; :: thesis: for f being PartFunc of REAL 2, REAL st z = <*x0,y0*> & f is_partial_differentiable`2_in z holds
( r = partdiff2 f,z iff ex x0, y0 being Real st
( z = <*x0,y0*> & ex N being Neighbourhood of y0 st
( N c= dom (SVF2 f,z) & ex L being LINEAR ex R being REST st
( r = L . 1 & ( for y being Real st y in N holds
((SVF2 f,z) . y) - ((SVF2 f,z) . y0) = (L . (y - y0)) + (R . (y - y0)) ) ) ) ) )
let f be PartFunc of REAL 2, REAL ; :: thesis: ( z = <*x0,y0*> & f is_partial_differentiable`2_in z implies ( r = partdiff2 f,z iff ex x0, y0 being Real st
( z = <*x0,y0*> & ex N being Neighbourhood of y0 st
( N c= dom (SVF2 f,z) & ex L being LINEAR ex R being REST st
( r = L . 1 & ( for y being Real st y in N holds
((SVF2 f,z) . y) - ((SVF2 f,z) . y0) = (L . (y - y0)) + (R . (y - y0)) ) ) ) ) ) )
assume AA:
( z = <*x0,y0*> & f is_partial_differentiable`2_in z )
; :: thesis: ( r = partdiff2 f,z iff ex x0, y0 being Real st
( z = <*x0,y0*> & ex N being Neighbourhood of y0 st
( N c= dom (SVF2 f,z) & ex L being LINEAR ex R being REST st
( r = L . 1 & ( for y being Real st y in N holds
((SVF2 f,z) . y) - ((SVF2 f,z) . y0) = (L . (y - y0)) + (R . (y - y0)) ) ) ) ) )
hereby :: thesis: ( ex x0, y0 being Real st
( z = <*x0,y0*> & ex N being Neighbourhood of y0 st
( N c= dom (SVF2 f,z) & ex L being LINEAR ex R being REST st
( r = L . 1 & ( for y being Real st y in N holds
((SVF2 f,z) . y) - ((SVF2 f,z) . y0) = (L . (y - y0)) + (R . (y - y0)) ) ) ) ) implies r = partdiff2 f,z )
assume
r = partdiff2 f,
z
;
:: thesis: ex x0, y0 being Real st
( z = <*x0,y0*> & ex N being Neighbourhood of y0 st
( N c= dom (SVF2 f,z) & ex L being LINEAR ex R being REST st
( r = L . 1 & ( for y being Real st y in N holds
((SVF2 f,z) . y) - ((SVF2 f,z) . y0) = (L . (y - y0)) + (R . (y - y0)) ) ) ) )then
r = diff (SVF2 f,z),
y0
by Th2, AA;
hence
ex
x0,
y0 being
Real st
(
z = <*x0,y0*> & ex
N being
Neighbourhood of
y0 st
(
N c= dom (SVF2 f,z) & ex
L being
LINEAR ex
R being
REST st
(
r = L . 1 & ( for
y being
Real st
y in N holds
((SVF2 f,z) . y) - ((SVF2 f,z) . y0) = (L . (y - y0)) + (R . (y - y0)) ) ) ) )
by def13, AA;
:: thesis: verum
end;
given x1, y1 being Real such that C1:
( z = <*x1,y1*> & ex N being Neighbourhood of y1 st
( N c= dom (SVF2 f,z) & ex L being LINEAR ex R being REST st
( r = L . 1 & ( for y being Real st y in N holds
((SVF2 f,z) . y) - ((SVF2 f,z) . y1) = (L . (y - y1)) + (R . (y - y1)) ) ) ) )
; :: thesis: r = partdiff2 f,z
r = diff (SVF2 f,z),y0
by C1, AA, def13;
hence
r = partdiff2 f,z
by Th2, AA; :: thesis: verum