let a be positive heavy Real; for c being positive light Real
for b, d being positive Real st log (a,b) <= log (c,d) & a < b holds
c > d
let c be positive light Real; for b, d being positive Real st log (a,b) <= log (c,d) & a < b holds
c > d
let b, d be positive Real; ( log (a,b) <= log (c,d) & a < b implies c > d )
assume A2:
( log (a,b) <= log (c,d) & a < b )
; c > d
then
log (a,b) > 1
by AG2;
then
log (c,d) > 1
by A2, XXREAL_0:2;
hence
c > d
by AM2; verum